Difference between revisions of "User:Maximilian Janisch/latexlist/latex/NoNroff/71"
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17. https://www.encyclopediaofmath.org/legacyimages/c/c021/c021450/c0214503.png ; $\tilde{Y}$ ; confidence 0.237 | 17. https://www.encyclopediaofmath.org/legacyimages/c/c021/c021450/c0214503.png ; $\tilde{Y}$ ; confidence 0.237 | ||
− | 18. https://www.encyclopediaofmath.org/legacyimages/a/a120/a120080/a12008023.png ; $a ( u , v ) = \int _ { \Omega } [ \sum _ { i , j = 1 } ^ { m } a _ { i , j } \frac { \partial u } { \partial x _ { i } } \frac { \partial \bar{v} } { \partial x _ { j } } + c ( x ) u \bar{v} ] d x$ ; confidence 0.237 | + | 18. https://www.encyclopediaofmath.org/legacyimages/a/a120/a120080/a12008023.png ; $a ( u , v ) = \int _ { \Omega } \left[ \sum _ { i , j = 1 } ^ { m } a _ { i , j } \frac { \partial u } { \partial x _ { i } } \frac { \partial \bar{v} } { \partial x _ { j } } + c ( x ) u \bar{v} \right] d x$ ; confidence 0.237 |
19. https://www.encyclopediaofmath.org/legacyimages/a/a130/a130130/a13013020.png ; $Q_0$ ; confidence 0.237 | 19. https://www.encyclopediaofmath.org/legacyimages/a/a130/a130130/a13013020.png ; $Q_0$ ; confidence 0.237 | ||
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21. https://www.encyclopediaofmath.org/legacyimages/b/b130/b130200/b13020044.png ; $a _ { i j } = 0$ ; confidence 0.237 | 21. https://www.encyclopediaofmath.org/legacyimages/b/b130/b130200/b13020044.png ; $a _ { i j } = 0$ ; confidence 0.237 | ||
− | 22. https://www.encyclopediaofmath.org/legacyimages/c/c120/c120180/c120180268.png ; $\ | + | 22. https://www.encyclopediaofmath.org/legacyimages/c/c120/c120180/c120180268.png ; $\mathsf{S} ^ { 2 } \cal E \subset \otimes ^ { * } E$ ; confidence 0.237 |
23. https://www.encyclopediaofmath.org/legacyimages/p/p120/p120140/p12014011.png ; $a _ { n } = \lambda \theta ^ { n } + \epsilon _ { n }$ ; confidence 0.237 | 23. https://www.encyclopediaofmath.org/legacyimages/p/p120/p120140/p12014011.png ; $a _ { n } = \lambda \theta ^ { n } + \epsilon _ { n }$ ; confidence 0.237 | ||
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33. https://www.encyclopediaofmath.org/legacyimages/f/f110/f110160/f110160167.png ; $\psi _ { \mathfrak { A } } ^ { l } e$ ; confidence 0.236 | 33. https://www.encyclopediaofmath.org/legacyimages/f/f110/f110160/f110160167.png ; $\psi _ { \mathfrak { A } } ^ { l } e$ ; confidence 0.236 | ||
− | 34. https://www.encyclopediaofmath.org/legacyimages/d/d030/d030290/d03029016.png ; $E _ { n } ( f ) = \operatorname { inf } _ { c _ { k } } \operatorname { sup } _ { x \in Q } | f ( x ) - \sum _ { k = 0 } ^ { n } c _ { k } s _ { k } ( x ) | \geq$ ; confidence 0.236 | + | 34. https://www.encyclopediaofmath.org/legacyimages/d/d030/d030290/d03029016.png ; $E _ { n } ( f ) = \operatorname { inf } _ { c _ { k } } \operatorname { sup } _ { x \in Q } \left| f ( x ) - \sum _ { k = 0 } ^ { n } c _ { k } s _ { k } ( x ) \right| \geq$ ; confidence 0.236 |
35. https://www.encyclopediaofmath.org/legacyimages/z/z130/z130110/z13011058.png ; $R _ { n } \stackrel { \omega } { \rightarrow } R \text { and } \operatorname { lim } _ { \varepsilon \rightarrow 0 } \operatorname { sup } _ { n } \int _ { 0 } ^ { \varepsilon } z R _ { n } ( d z ) = 0,$ ; confidence 0.236 | 35. https://www.encyclopediaofmath.org/legacyimages/z/z130/z130110/z13011058.png ; $R _ { n } \stackrel { \omega } { \rightarrow } R \text { and } \operatorname { lim } _ { \varepsilon \rightarrow 0 } \operatorname { sup } _ { n } \int _ { 0 } ^ { \varepsilon } z R _ { n } ( d z ) = 0,$ ; confidence 0.236 | ||
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37. https://www.encyclopediaofmath.org/legacyimages/e/e130/e130070/e13007076.png ; $S \ll ( T / N ) ^ { p } N ^ { q }$ ; confidence 0.236 | 37. https://www.encyclopediaofmath.org/legacyimages/e/e130/e130070/e13007076.png ; $S \ll ( T / N ) ^ { p } N ^ { q }$ ; confidence 0.236 | ||
− | 38. https://www.encyclopediaofmath.org/legacyimages/s/s120/s120230/s12023050.png ; $\frac { \Gamma _ { p } [ \frac { \delta + n + p - 1 } { 2 } ] } { ( 2 \pi ) ^ { n p / 2 } | \Sigma | ^ { n / 2 } \Gamma _ { p } [ \frac { \delta + p - 1 } { 2 } ] }.$ ; confidence 0.236 | + | 38. https://www.encyclopediaofmath.org/legacyimages/s/s120/s120230/s12023050.png ; $\frac { \Gamma _ { p } \left[ \frac { \delta + n + p - 1 } { 2 } \right] } { ( 2 \pi ) ^ { n p / 2 } | \Sigma | ^ { n / 2 } \Gamma _ { p } \left[ \frac { \delta + p - 1 } { 2 } \right] }.$ ; confidence 0.236 |
39. https://www.encyclopediaofmath.org/legacyimages/t/t130/t130140/t130140178.png ; $| I _ { C } |$ ; confidence 0.236 | 39. https://www.encyclopediaofmath.org/legacyimages/t/t130/t130140/t130140178.png ; $| I _ { C } |$ ; confidence 0.236 | ||
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41. https://www.encyclopediaofmath.org/legacyimages/w/w130/w130080/w130080122.png ; $\hat{T} _ { n } = T _ { n } T _ { 1 } ^ { - 1 } , \hat { u } _ { k } = T _ { 1 } ^ { k } u _ { k },$ ; confidence 0.236 | 41. https://www.encyclopediaofmath.org/legacyimages/w/w130/w130080/w130080122.png ; $\hat{T} _ { n } = T _ { n } T _ { 1 } ^ { - 1 } , \hat { u } _ { k } = T _ { 1 } ^ { k } u _ { k },$ ; confidence 0.236 | ||
− | 42. https://www.encyclopediaofmath.org/legacyimages/m/m120/m120090/m12009043.png ; $( P ( D ) ( \phi ) ) _ { \ | + | 42. https://www.encyclopediaofmath.org/legacyimages/m/m120/m120090/m12009043.png ; $( P ( D ) ( \phi ) )_{ \widehat{}} ( \xi ) = P ( \xi ) \widehat { \phi } ( \xi )$ ; confidence 0.235 |
43. https://www.encyclopediaofmath.org/legacyimages/a/a130/a130240/a130240370.png ; $=$ ; confidence 0.235 | 43. https://www.encyclopediaofmath.org/legacyimages/a/a130/a130240/a130240370.png ; $=$ ; confidence 0.235 | ||
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54. https://www.encyclopediaofmath.org/legacyimages/l/l120/l120050/l1200505.png ; $\operatorname{Re}$ ; confidence 0.234 | 54. https://www.encyclopediaofmath.org/legacyimages/l/l120/l120050/l1200505.png ; $\operatorname{Re}$ ; confidence 0.234 | ||
− | 55. https://www.encyclopediaofmath.org/legacyimages/b/b120/b120130/b12013057.png ; $L _ { | + | 55. https://www.encyclopediaofmath.org/legacyimages/b/b120/b120130/b12013057.png ; $L _ { a } ^ { p } ( G ) = L _ { a } ^ { p }$ ; confidence 0.234 |
56. https://www.encyclopediaofmath.org/legacyimages/h/h130/h130070/h13007034.png ; $\alpha _ { i } \in { k }$ ; confidence 0.234 | 56. https://www.encyclopediaofmath.org/legacyimages/h/h130/h130070/h13007034.png ; $\alpha _ { i } \in { k }$ ; confidence 0.234 | ||
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66. https://www.encyclopediaofmath.org/legacyimages/l/l120/l120200/l1202008.png ; $\cup _ { i = 1 } ^ { m } A _ { i } \cup ( - A _ { i } ) = S ^ { n }$ ; confidence 0.233 | 66. https://www.encyclopediaofmath.org/legacyimages/l/l120/l120200/l1202008.png ; $\cup _ { i = 1 } ^ { m } A _ { i } \cup ( - A _ { i } ) = S ^ { n }$ ; confidence 0.233 | ||
− | 67. https://www.encyclopediaofmath.org/legacyimages/s/s130/s130590/s13059038.png ; $P _ { n } = M [ \frac { Q _ { n } ( t ) - Q _ { n } ( z ) } { t - z } ] , n = 0,1 ,\dots .$ ; confidence 0.233 | + | 67. https://www.encyclopediaofmath.org/legacyimages/s/s130/s130590/s13059038.png ; $P _ { n } = M \left[ \frac { Q _ { n } ( t ) - Q _ { n } ( z ) } { t - z } \right] , n = 0,1 ,\dots .$ ; confidence 0.233 |
− | 68. https://www.encyclopediaofmath.org/legacyimages/b/b130/b130100/b13010043.png ; $L _ { | + | 68. https://www.encyclopediaofmath.org/legacyimages/b/b130/b130100/b13010043.png ; $L _ { a } ^ { 2 } ( D )$ ; confidence 0.232 |
69. https://www.encyclopediaofmath.org/legacyimages/v/v120/v120020/v120020225.png ; $\delta ^ { * } : H ^ { n } ( \Gamma _ { S ^ { n } } ) \rightarrow H ^ { n + 1 } ( \Gamma _ { \bar{D} \square ^ { n + 1 } } , \Gamma _ { S ^ { n } } )$ ; confidence 0.232 | 69. https://www.encyclopediaofmath.org/legacyimages/v/v120/v120020/v120020225.png ; $\delta ^ { * } : H ^ { n } ( \Gamma _ { S ^ { n } } ) \rightarrow H ^ { n + 1 } ( \Gamma _ { \bar{D} \square ^ { n + 1 } } , \Gamma _ { S ^ { n } } )$ ; confidence 0.232 | ||
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72. https://www.encyclopediaofmath.org/legacyimages/s/s130/s130530/s13053084.png ; $n = a _ { 1 } + \ldots + a _ { s }$ ; confidence 0.232 | 72. https://www.encyclopediaofmath.org/legacyimages/s/s130/s130530/s13053084.png ; $n = a _ { 1 } + \ldots + a _ { s }$ ; confidence 0.232 | ||
− | 73. https://www.encyclopediaofmath.org/legacyimages/b/b120/b120430/b12043040.png ; $\Delta x = x \bigotimes 1 + 1 \bigotimes x$ ; confidence 0.232 | + | 73. https://www.encyclopediaofmath.org/legacyimages/b/b120/b120430/b12043040.png ; $\Delta x = x \bigotimes 1 + 1 \bigotimes x,$ ; confidence 0.232 |
74. https://www.encyclopediaofmath.org/legacyimages/a/a130/a130180/a13018064.png ; ${\bf Alg}_\models( L _ { n } )$ ; confidence 0.232 | 74. https://www.encyclopediaofmath.org/legacyimages/a/a130/a130180/a13018064.png ; ${\bf Alg}_\models( L _ { n } )$ ; confidence 0.232 | ||
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83. https://www.encyclopediaofmath.org/legacyimages/f/f120/f120200/f12020014.png ; $e _ { 1 } , \dots , e _ { n } , - ( a _ { 0 } e _ { 1 } + \ldots + a _ { n - 1} e _ { n } )$ ; confidence 0.231 | 83. https://www.encyclopediaofmath.org/legacyimages/f/f120/f120200/f12020014.png ; $e _ { 1 } , \dots , e _ { n } , - ( a _ { 0 } e _ { 1 } + \ldots + a _ { n - 1} e _ { n } )$ ; confidence 0.231 | ||
− | 84. https://www.encyclopediaofmath.org/legacyimages/a/a130/a130060/a13006044.png ; $P _ { q } ^\# ( n ) = \frac { 1 } { n } \sum _ { r | n } \mu ( r ) q ^ { n / r }$ ; confidence 0.230 | + | 84. https://www.encyclopediaofmath.org/legacyimages/a/a130/a130060/a13006044.png ; $P _ { q } ^\# ( n ) = \frac { 1 } { n } \sum _ { r | n } \mu ( r ) q ^ { n / r },$ ; confidence 0.230 |
− | 85. https://www.encyclopediaofmath.org/legacyimages/g/g130/g130030/g13003055.png ; ${\cal I} _ { 0 , loc } = \{ ( u _ { j } ) _ { j \in \bf N }$ ; confidence 0.230 | + | 85. https://www.encyclopediaofmath.org/legacyimages/g/g130/g130030/g13003055.png ; ${\cal I} _ { 0 , \operatorname{loc} } = \{ ( u _ { j } ) _ { j \in \bf N }$ ; confidence 0.230 |
86. https://www.encyclopediaofmath.org/legacyimages/b/b015/b015400/b01540047.png ; $Z _ { 1 } , \dots , Z _ { m }$ ; confidence 0.230 | 86. https://www.encyclopediaofmath.org/legacyimages/b/b015/b015400/b01540047.png ; $Z _ { 1 } , \dots , Z _ { m }$ ; confidence 0.230 | ||
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90. https://www.encyclopediaofmath.org/legacyimages/b/b110/b110590/b11059041.png ; $g_1$ ; confidence 0.230 | 90. https://www.encyclopediaofmath.org/legacyimages/b/b110/b110590/b11059041.png ; $g_1$ ; confidence 0.230 | ||
− | 91. https://www.encyclopediaofmath.org/legacyimages/b/b120/b120430/b120430119.png ; $\Psi ( \alpha \bigotimes \beta ) = q \beta \bigotimes \alpha$ ; confidence 0.230 | + | 91. https://www.encyclopediaofmath.org/legacyimages/b/b120/b120430/b120430119.png ; $\Psi ( \alpha \bigotimes \beta ) = q \beta \bigotimes \alpha,$ ; confidence 0.230 |
92. https://www.encyclopediaofmath.org/legacyimages/h/h110/h110010/h11001013.png ; $ { L } = 1$ ; confidence 0.230 | 92. https://www.encyclopediaofmath.org/legacyimages/h/h110/h110010/h11001013.png ; $ { L } = 1$ ; confidence 0.230 | ||
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94. https://www.encyclopediaofmath.org/legacyimages/c/c120/c120070/c12007015.png ; $+\sum _ { i < n + 1 } ( - 1 ) ^ { n + 1 - i } \operatorname { pr }_{ ( \alpha _ { 1 } , \dots , \alpha _ { i + 1 } \alpha _ { i } , \ldots , \alpha _ { n + 1 } ) }+$ ; confidence 0.229 | 94. https://www.encyclopediaofmath.org/legacyimages/c/c120/c120070/c12007015.png ; $+\sum _ { i < n + 1 } ( - 1 ) ^ { n + 1 - i } \operatorname { pr }_{ ( \alpha _ { 1 } , \dots , \alpha _ { i + 1 } \alpha _ { i } , \ldots , \alpha _ { n + 1 } ) }+$ ; confidence 0.229 | ||
− | 95. https://www.encyclopediaofmath.org/legacyimages/d/d120/d120020/d120020136.png ; $\hat { | + | 95. https://www.encyclopediaofmath.org/legacyimages/d/d120/d120020/d120020136.png ; $\hat { c }_k^1< 0$ ; confidence 0.229 |
96. https://www.encyclopediaofmath.org/legacyimages/z/z130/z130110/z130110144.png ; $\mu _ { n } \rightarrow \infty \quad \text { but } \frac { \mu _ { n } } { n } \rightarrow 0$ ; confidence 0.229 | 96. https://www.encyclopediaofmath.org/legacyimages/z/z130/z130110/z130110144.png ; $\mu _ { n } \rightarrow \infty \quad \text { but } \frac { \mu _ { n } } { n } \rightarrow 0$ ; confidence 0.229 | ||
− | 97. https://www.encyclopediaofmath.org/legacyimages/s/s120/s120260/s12026023.png ; $D_t^*f = ( 0 , \delta _ { t } \widehat { \ | + | 97. https://www.encyclopediaofmath.org/legacyimages/s/s120/s120260/s12026023.png ; $D_t^*f = ( 0 , \delta _ { t } \widehat { \bigotimes } f ^ { n } ) _ { n \in \bf N }.$ ; confidence 0.229 |
98. https://www.encyclopediaofmath.org/legacyimages/k/k130/k130060/k13006031.png ; $\left( \begin{array} { c } { a _ { k - 1 } } \\ { k - 1 } \end{array} \right) \leq m - \left( \begin{array} { c } { a _ { k } } \\ { k } \end{array} \right)$ ; confidence 0.229 | 98. https://www.encyclopediaofmath.org/legacyimages/k/k130/k130060/k13006031.png ; $\left( \begin{array} { c } { a _ { k - 1 } } \\ { k - 1 } \end{array} \right) \leq m - \left( \begin{array} { c } { a _ { k } } \\ { k } \end{array} \right)$ ; confidence 0.229 | ||
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99. https://www.encyclopediaofmath.org/legacyimages/z/z130/z130030/z13003076.png ; $g_{mb , na}$ ; confidence 0.229 | 99. https://www.encyclopediaofmath.org/legacyimages/z/z130/z130030/z13003076.png ; $g_{mb , na}$ ; confidence 0.229 | ||
− | 100. https://www.encyclopediaofmath.org/legacyimages/q/q120/q120070/q12007036.png ; $u _ { q } ( { | + | 100. https://www.encyclopediaofmath.org/legacyimages/q/q120/q120070/q12007036.png ; $u _ { q } ( \operatorname{sl} _ { 2 } )$ ; confidence 0.229 |
101. https://www.encyclopediaofmath.org/legacyimages/d/d120/d120280/d12028063.png ; $\tilde { D } = \{ w : w _ { 1 } z _ { 1 } + \ldots + w _ { n } z _ { n } \neq 1 , z \in D \}$ ; confidence 0.229 | 101. https://www.encyclopediaofmath.org/legacyimages/d/d120/d120280/d12028063.png ; $\tilde { D } = \{ w : w _ { 1 } z _ { 1 } + \ldots + w _ { n } z _ { n } \neq 1 , z \in D \}$ ; confidence 0.229 | ||
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105. https://www.encyclopediaofmath.org/legacyimages/b/b110/b110450/b11045014.png ; $u_i$ ; confidence 0.229 | 105. https://www.encyclopediaofmath.org/legacyimages/b/b110/b110450/b11045014.png ; $u_i$ ; confidence 0.229 | ||
− | 106. https://www.encyclopediaofmath.org/legacyimages/o/o130/o130010/o130010155.png ; $\tilde { \chi } ( \xi ) = \frac { 8 \pi } { \xi ^ { 2 } } \operatorname { lim } _ { \varepsilon \downarrow 0 } \int _ { S ^ { 2 } } A ( \theta ^ { \prime } , \alpha ) v _ { \varepsilon } ( \alpha , \theta ) d \alpha$ ; confidence 0.228 | + | 106. https://www.encyclopediaofmath.org/legacyimages/o/o130/o130010/o130010155.png ; $\tilde { \chi } ( \xi ) = \frac { 8 \pi } { \xi ^ { 2 } } \operatorname { lim } _ { \varepsilon \downarrow 0 } \int _ { S ^ { 2 } } A ( \theta ^ { \prime } , \alpha ) v _ { \varepsilon } ( \alpha , \theta ) d \alpha,$ ; confidence 0.228 |
107. https://www.encyclopediaofmath.org/legacyimages/m/m120/m120160/m12016066.png ; $t \in {\bf R} ^ { p _ { 1 } n _ { 1 } }$ ; confidence 0.228 | 107. https://www.encyclopediaofmath.org/legacyimages/m/m120/m120160/m12016066.png ; $t \in {\bf R} ^ { p _ { 1 } n _ { 1 } }$ ; confidence 0.228 | ||
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114. https://www.encyclopediaofmath.org/legacyimages/p/p130/p130100/p1301008.png ; $\hat { K } = \{ z \in {\bf C} ^ { n } : | P ( z ) | \leq \| P \| _ { K } , \forall P \in {\cal P} \},$ ; confidence 0.228 | 114. https://www.encyclopediaofmath.org/legacyimages/p/p130/p130100/p1301008.png ; $\hat { K } = \{ z \in {\bf C} ^ { n } : | P ( z ) | \leq \| P \| _ { K } , \forall P \in {\cal P} \},$ ; confidence 0.228 | ||
− | 115. https://www.encyclopediaofmath.org/legacyimages/i/i130/i130040/i13004018.png ; $\ | + | 115. https://www.encyclopediaofmath.org/legacyimages/i/i130/i130040/i13004018.png ; $\operatorname{ bt}$ ; confidence 0.228 |
116. https://www.encyclopediaofmath.org/legacyimages/s/s090/s090670/s09067093.png ; $\theta \rightarrow g \theta = ( g _ { a } ^ { i } d u ^ { a } )$ ; confidence 0.228 | 116. https://www.encyclopediaofmath.org/legacyimages/s/s090/s090670/s09067093.png ; $\theta \rightarrow g \theta = ( g _ { a } ^ { i } d u ^ { a } )$ ; confidence 0.228 | ||
− | 117. https://www.encyclopediaofmath.org/legacyimages/e/e120/e120020/e12002048.png ; ${ | + | 117. https://www.encyclopediaofmath.org/legacyimages/e/e120/e120020/e12002048.png ; $\operatorname{map}_{ *} ( ., . )$ ; confidence 0.227 |
118. https://www.encyclopediaofmath.org/legacyimages/a/a011/a011660/a01166066.png ; $x _ { 2 } , \dots , x _ { n }$ ; confidence 0.227 | 118. https://www.encyclopediaofmath.org/legacyimages/a/a011/a011660/a01166066.png ; $x _ { 2 } , \dots , x _ { n }$ ; confidence 0.227 | ||
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121. https://www.encyclopediaofmath.org/legacyimages/s/s130/s130510/s130510146.png ; $\infty ( L _ { 1 } ) \bigoplus \infty ( L _ { 2 } ) = \infty ( L _ { 2 } ) \bigoplus \infty ( L _ { 1 } ) = \infty ( \emptyset ).$ ; confidence 0.227 | 121. https://www.encyclopediaofmath.org/legacyimages/s/s130/s130510/s130510146.png ; $\infty ( L _ { 1 } ) \bigoplus \infty ( L _ { 2 } ) = \infty ( L _ { 2 } ) \bigoplus \infty ( L _ { 1 } ) = \infty ( \emptyset ).$ ; confidence 0.227 | ||
− | 122. https://www.encyclopediaofmath.org/legacyimages/b/b120/b120300/b12030032.png ; ${\cal A} = - \sum _ { k , l = 1 } ^ { N } \frac { \partial } { \partial y _ { k } } ( a _ { k l } ( y ) \frac { \partial } { \partial | + | 122. https://www.encyclopediaofmath.org/legacyimages/b/b120/b120300/b12030032.png ; ${\cal A} = - \sum _ { k , \operatorname{l} = 1 } ^ { N } \frac { \partial } { \partial y _ { k } } ( a _ { k \operatorname{l} } ( y ) \frac { \partial } { \partial y_{\operatorname{l}} } ),$ ; confidence 0.226 |
123. https://www.encyclopediaofmath.org/legacyimages/n/n120/n120110/n12011062.png ; $\xi ( ., \dots , . )$ ; confidence 0.226 | 123. https://www.encyclopediaofmath.org/legacyimages/n/n120/n120110/n12011062.png ; $\xi ( ., \dots , . )$ ; confidence 0.226 | ||
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126. https://www.encyclopediaofmath.org/legacyimages/h/h130/h130020/h13002055.png ; $\{ w ( a ) \} _ { a \in A }$ ; confidence 0.226 | 126. https://www.encyclopediaofmath.org/legacyimages/h/h130/h130020/h13002055.png ; $\{ w ( a ) \} _ { a \in A }$ ; confidence 0.226 | ||
− | 127. https://www.encyclopediaofmath.org/legacyimages/s/s120/s120230/s120230153.png ; $( X A _ { 1 } X ^ { \prime } , \ldots , X A _ { s } X ^ { \prime } ) \sim L _ { s } ^ { ( 1 ) } ( f _ { 1 } , \frac { n _ { 1 } } { 2 } , \dots , \frac { n _ { s } } { 2 } ),$ ; confidence 0.226 | + | 127. https://www.encyclopediaofmath.org/legacyimages/s/s120/s120230/s120230153.png ; $\left( X A _ { 1 } X ^ { \prime } , \ldots , X A _ { s } X ^ { \prime } ) \sim L _ { s } ^ { ( 1 ) } ( f _ { 1 } , \frac { n _ { 1 } } { 2 } , \dots , \frac { n _ { s } } { 2 } \right),$ ; confidence 0.226 |
128. https://www.encyclopediaofmath.org/legacyimages/f/f110/f110160/f11016049.png ; $f _ { \mathfrak { B } }$ ; confidence 0.226 | 128. https://www.encyclopediaofmath.org/legacyimages/f/f110/f110160/f11016049.png ; $f _ { \mathfrak { B } }$ ; confidence 0.226 | ||
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137. https://www.encyclopediaofmath.org/legacyimages/t/t130/t130140/t13014064.png ; ${\cal G} \operatorname{l} _ { Q } ( d ) = \prod _ { j \in Q _ { 0 } } \operatorname{Gl} ( v _ { j } , K )$ ; confidence 0.225 | 137. https://www.encyclopediaofmath.org/legacyimages/t/t130/t130140/t13014064.png ; ${\cal G} \operatorname{l} _ { Q } ( d ) = \prod _ { j \in Q _ { 0 } } \operatorname{Gl} ( v _ { j } , K )$ ; confidence 0.225 | ||
− | 138. https://www.encyclopediaofmath.org/legacyimages/t/t120/t120200/t12020022.png ; $\operatorname { inf } _ { z _ { j } } \operatorname { max } _ { k \in S } ( \frac { | \sum _ { j = 1 } ^ { n } b _ { j } z _ { j } ^ { k } | \psi ( k , n ) } { M _ { d } ( k ) } ) ^ { 1 / k }$ ; confidence 0.225 | + | 138. https://www.encyclopediaofmath.org/legacyimages/t/t120/t120200/t12020022.png ; $\operatorname { inf } _ { z _ { j } } \operatorname { max } _ { k \in S } \left( \frac { | \sum _ { j = 1 } ^ { n } b _ { j } z _ { j } ^ { k } | \psi ( k , n ) } { M _ { d } ( k ) } \right) ^ { 1 / k }$ ; confidence 0.225 |
139. https://www.encyclopediaofmath.org/legacyimages/t/t120/t120200/t12020063.png ; $R _ { n } = \operatorname { min } _ { z _ { j } } \operatorname { max } _ { k = 1 , \ldots , n } | s _ { k } |$ ; confidence 0.225 | 139. https://www.encyclopediaofmath.org/legacyimages/t/t120/t120200/t12020063.png ; $R _ { n } = \operatorname { min } _ { z _ { j } } \operatorname { max } _ { k = 1 , \ldots , n } | s _ { k } |$ ; confidence 0.225 | ||
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144. https://www.encyclopediaofmath.org/legacyimages/r/r130/r130080/r130080135.png ; $\sum _ { j = 1 } ^ { \infty } \lambda _ { j } ^ { - 1 } ( u , \varphi_j ) _ { 0 } \varphi _ { j } ( x ) = \sum _ { j = 1 } ^ { \infty } w _ { j } \varphi _ { j } ( x ) = w ( x )$ ; confidence 0.224 | 144. https://www.encyclopediaofmath.org/legacyimages/r/r130/r130080/r130080135.png ; $\sum _ { j = 1 } ^ { \infty } \lambda _ { j } ^ { - 1 } ( u , \varphi_j ) _ { 0 } \varphi _ { j } ( x ) = \sum _ { j = 1 } ^ { \infty } w _ { j } \varphi _ { j } ( x ) = w ( x )$ ; confidence 0.224 | ||
− | 145. https://www.encyclopediaofmath.org/legacyimages/v/v096/v096040/v09604019.png ; $\ | + | 145. https://www.encyclopediaofmath.org/legacyimages/v/v096/v096040/v09604019.png ; $\mathsf{P} ( Y (T ) ) \mathsf{P} ( Z < T )$ ; confidence 0.224 |
146. https://www.encyclopediaofmath.org/legacyimages/b/b120/b120020/b12002030.png ; $X _ { i } = Q ( U _ { i } )$ ; confidence 0.224 | 146. https://www.encyclopediaofmath.org/legacyimages/b/b120/b120020/b12002030.png ; $X _ { i } = Q ( U _ { i } )$ ; confidence 0.224 | ||
− | 147. https://www.encyclopediaofmath.org/legacyimages/b/b120/b120030/b12003038.png ; $\ | + | 147. https://www.encyclopediaofmath.org/legacyimages/b/b120/b120030/b12003038.png ; $\hat{g}$ ; confidence 0.224 |
− | 148. https://www.encyclopediaofmath.org/legacyimages/g/g120/g120070/g12007040.png ; $K O _ { m } ( {\bf R} \pi ) = {\cal Z} _ { m } ^ { \pi } / i ^ { * } {\cal Z} _ { m + 1 } ^ { \pi }$ ; confidence 0.224 | + | 148. https://www.encyclopediaofmath.org/legacyimages/g/g120/g120070/g12007040.png ; $K O _ { m } ( {\bf R} \pi ) = {\cal Z} _ { m } ^ { \pi } / i ^ { * } {\cal Z} _ { m + 1 } ^ { \pi }.$ ; confidence 0.224 |
149. https://www.encyclopediaofmath.org/legacyimages/h/h047/h047580/h04758011.png ; $x _ { \nu }$ ; confidence 0.223 | 149. https://www.encyclopediaofmath.org/legacyimages/h/h047/h047580/h04758011.png ; $x _ { \nu }$ ; confidence 0.223 | ||
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151. https://www.encyclopediaofmath.org/legacyimages/a/a110/a110160/a11016098.png ; $\kappa$ ; confidence 0.223 | 151. https://www.encyclopediaofmath.org/legacyimages/a/a110/a110160/a11016098.png ; $\kappa$ ; confidence 0.223 | ||
− | 152. https://www.encyclopediaofmath.org/legacyimages/j/j130/j130020/j13002025.png ; $- \ | + | 152. https://www.encyclopediaofmath.org/legacyimages/j/j130/j130020/j13002025.png ; $- \mathsf{E} X ( 1 + o ( 1 ) )$ ; confidence 0.223 |
153. https://www.encyclopediaofmath.org/legacyimages/c/c120/c120300/c12030068.png ; ${\cal B} \rtimes _ { \alpha } {\bf Z} \simeq {\cal O} _ { n } \otimes \cal K$ ; confidence 0.223 | 153. https://www.encyclopediaofmath.org/legacyimages/c/c120/c120300/c12030068.png ; ${\cal B} \rtimes _ { \alpha } {\bf Z} \simeq {\cal O} _ { n } \otimes \cal K$ ; confidence 0.223 | ||
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155. https://www.encyclopediaofmath.org/legacyimages/r/r130/r130140/r13014028.png ; $f ( x ) \mapsto ( S ^ { \alpha } f ) ( x ) = \int _ { | \xi | \leq 1 } \hat { f} ( \xi ) ( 1 - | \xi | ^ { 2 } ) ^ { \alpha } e ^ { 2 \pi i x . \xi } d \xi, $ ; confidence 0.223 | 155. https://www.encyclopediaofmath.org/legacyimages/r/r130/r130140/r13014028.png ; $f ( x ) \mapsto ( S ^ { \alpha } f ) ( x ) = \int _ { | \xi | \leq 1 } \hat { f} ( \xi ) ( 1 - | \xi | ^ { 2 } ) ^ { \alpha } e ^ { 2 \pi i x . \xi } d \xi, $ ; confidence 0.223 | ||
− | 156. https://www.encyclopediaofmath.org/legacyimages/f/f130/f130090/f13009025.png ; $\left. \begin{cases}{ U _ { 0 } ( x , y ) = 0 ,}\\{ U _ { 1 } ( x , y ) = 1, }\\{ U _ { n } ( x , y ) = x U _ { n - 1 } ( x , y ) + y U _ { n - 2 } ( x , y ), }\\{ n = 2 , 3 , \ldots ,}\end{cases} \right.$ ; confidence 0.223 | + | 156. https://www.encyclopediaofmath.org/legacyimages/f/f130/f130090/f13009025.png ; $\left. \begin{cases}{ U _ { 0 } ( x , y ) = 0 ,}\\{ U _ { 1 } ( x , y ) = 1, }\\{ U _ { n } ( x , y ) = x U _ { n - 1 } ( x , y ) + y U _ { n - 2 } ( x , y ), }\\{ \quad n = 2 , 3 , \ldots ,}\end{cases} \right.$ ; confidence 0.223 |
157. https://www.encyclopediaofmath.org/legacyimages/d/d120/d120050/d12005068.png ; $C \subset \operatorname{Ext} \subset \operatorname{ACS} \subset\operatorname{Conn} \subset D,$ ; confidence 0.223 | 157. https://www.encyclopediaofmath.org/legacyimages/d/d120/d120050/d12005068.png ; $C \subset \operatorname{Ext} \subset \operatorname{ACS} \subset\operatorname{Conn} \subset D,$ ; confidence 0.223 | ||
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169. https://www.encyclopediaofmath.org/legacyimages/w/w097/w097590/w09759034.png ; $\phi = \sum \phi _ { v } : \operatorname{WC} ( A , k ) \rightarrow \sum _ { v } \operatorname{WC} ( A , k _ { v } ),$ ; confidence 0.221 | 169. https://www.encyclopediaofmath.org/legacyimages/w/w097/w097590/w09759034.png ; $\phi = \sum \phi _ { v } : \operatorname{WC} ( A , k ) \rightarrow \sum _ { v } \operatorname{WC} ( A , k _ { v } ),$ ; confidence 0.221 | ||
− | 170. https://www.encyclopediaofmath.org/legacyimages/b/b120/b120090/b12009054.png ; $= \{ \frac { m } { 1 + a ^ { 2 } } \int _ { 0 } ^ { z } \frac { p _ { 1 } ( s ) - a i } { s ^ { 1 - \frac { m } { 1 + a i } } } e ^ { \frac { m } { 1 + a ^ { 2 } } \int _ { 0 } ^ { s } \frac { p _ { 0 } ( t ) - 1 } { t } d t } d s \}^{\frac{1+ai}{m}},$ ; confidence 0.221 | + | 170. https://www.encyclopediaofmath.org/legacyimages/b/b120/b120090/b12009054.png ; $= \left\{ \frac { m } { 1 + a ^ { 2 } } \int _ { 0 } ^ { z } \frac { p _ { 1 } ( s ) - a i } { s ^ { 1 - \frac { m } { 1 + a i } } } e ^ { \frac { m } { 1 + a ^ { 2 } } \int _ { 0 } ^ { s } \frac { p _ { 0 } ( t ) - 1 } { t } d t } d s \right\}^{\frac{1+ai}{m}},$ ; confidence 0.221 |
171. https://www.encyclopediaofmath.org/legacyimages/a/a120/a120270/a12027065.png ; $h _ { P }$ ; confidence 0.221 | 171. https://www.encyclopediaofmath.org/legacyimages/a/a120/a120270/a12027065.png ; $h _ { P }$ ; confidence 0.221 | ||
− | 172. https://www.encyclopediaofmath.org/legacyimages/j/j130/j130020/j13002020.png ; $\epsilon = \operatorname { max } \ | + | 172. https://www.encyclopediaofmath.org/legacyimages/j/j130/j130020/j13002020.png ; $\epsilon = \operatorname { max } \mathsf{E} I_A$ ; confidence 0.221 |
173. https://www.encyclopediaofmath.org/legacyimages/w/w120/w120140/w12014031.png ; $n < \aleph_0$ ; confidence 0.221 | 173. https://www.encyclopediaofmath.org/legacyimages/w/w120/w120140/w12014031.png ; $n < \aleph_0$ ; confidence 0.221 | ||
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183. https://www.encyclopediaofmath.org/legacyimages/a/a130/a130040/a130040114.png ; $T , \psi \vdash _ {\cal D } \varphi$ ; confidence 0.220 | 183. https://www.encyclopediaofmath.org/legacyimages/a/a130/a130040/a130040114.png ; $T , \psi \vdash _ {\cal D } \varphi$ ; confidence 0.220 | ||
− | 184. https://www.encyclopediaofmath.org/legacyimages/g/g130/g130040/g130040177.png ; $T _ { | + | 184. https://www.encyclopediaofmath.org/legacyimages/g/g130/g130040/g130040177.png ; $T _ { x }$ ; confidence 0.219 |
185. https://www.encyclopediaofmath.org/legacyimages/f/f130/f130240/f13024011.png ; $L ( a , b ) c = \langle a b c \rangle$ ; confidence 0.219 | 185. https://www.encyclopediaofmath.org/legacyimages/f/f130/f130240/f13024011.png ; $L ( a , b ) c = \langle a b c \rangle$ ; confidence 0.219 | ||
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188. https://www.encyclopediaofmath.org/legacyimages/k/k130/k130020/k13002030.png ; $( x_j, y_j )$ ; confidence 0.219 | 188. https://www.encyclopediaofmath.org/legacyimages/k/k130/k130020/k13002030.png ; $( x_j, y_j )$ ; confidence 0.219 | ||
− | 189. https://www.encyclopediaofmath.org/legacyimages/l/l120/l120120/l120120106.png ; ${\cal U} _ { \ | + | 189. https://www.encyclopediaofmath.org/legacyimages/l/l120/l120120/l120120106.png ; ${\cal U} _ { \operatorname { p } }$ ; confidence 0.219 |
190. https://www.encyclopediaofmath.org/legacyimages/d/d130/d130060/d1300605.png ; $\operatorname{Bel}: 2 ^ { \Xi } \rightarrow [ 0,1 ]$ ; confidence 0.219 | 190. https://www.encyclopediaofmath.org/legacyimages/d/d130/d130060/d1300605.png ; $\operatorname{Bel}: 2 ^ { \Xi } \rightarrow [ 0,1 ]$ ; confidence 0.219 | ||
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199. https://www.encyclopediaofmath.org/legacyimages/p/p110/p110200/p1102006.png ; $a_4$ ; confidence 0.218 | 199. https://www.encyclopediaofmath.org/legacyimages/p/p110/p110200/p1102006.png ; $a_4$ ; confidence 0.218 | ||
− | 200. https://www.encyclopediaofmath.org/legacyimages/a/a010/a010200/a01020082.png ; $\frak | + | 200. https://www.encyclopediaofmath.org/legacyimages/a/a010/a010200/a01020082.png ; $\frak A$ ; confidence 0.218 |
201. https://www.encyclopediaofmath.org/legacyimages/w/w120/w120030/w12003015.png ; ${\bf l}_1 ( \Gamma )$ ; confidence 0.218 | 201. https://www.encyclopediaofmath.org/legacyimages/w/w120/w120030/w12003015.png ; ${\bf l}_1 ( \Gamma )$ ; confidence 0.218 | ||
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202. https://www.encyclopediaofmath.org/legacyimages/c/c120/c120080/c12008072.png ; $\Delta ( A , E ) = \sum _ { i = 0 } ^ { m } I \bigotimes D _ { i , n - i } A ^ { i } E ^ { m - i } = 0.$ ; confidence 0.218 | 202. https://www.encyclopediaofmath.org/legacyimages/c/c120/c120080/c12008072.png ; $\Delta ( A , E ) = \sum _ { i = 0 } ^ { m } I \bigotimes D _ { i , n - i } A ^ { i } E ^ { m - i } = 0.$ ; confidence 0.218 | ||
− | 203. https://www.encyclopediaofmath.org/legacyimages/w/w120/w120110/w120110167.png ; $\operatorname { sup } _ { x \in K \atop \xi \in {\bf R} ^ { n } } | ( D _ { x } ^ { \alpha } D _ { \xi } ^ { \beta } r _ { m - 2 } ) ( x , \xi ) | ( 1 + | \xi | ) ^ { 2 - m + | \beta | } < \infty.$ ; confidence 0.218 | + | 203. https://www.encyclopediaofmath.org/legacyimages/w/w120/w120110/w120110167.png ; $\operatorname { sup } _ { x \in K, \atop \xi \in {\bf R} ^ { n } } \left| ( D _ { x } ^ { \alpha } D _ { \xi } ^ { \beta } r _ { m - 2 } ) ( x , \xi ) \right| ( 1 + | \xi | ) ^ { 2 - m + | \beta | } < \infty.$ ; confidence 0.218 |
204. https://www.encyclopediaofmath.org/legacyimages/g/g130/g130010/g13001058.png ; $\operatorname { Tr } _ { E / F } ( \beta _ { i } \gamma _ { j } ) = \delta _ { i j } \text { for } i , j = 0 , \dots , n - 1.$ ; confidence 0.218 | 204. https://www.encyclopediaofmath.org/legacyimages/g/g130/g130010/g13001058.png ; $\operatorname { Tr } _ { E / F } ( \beta _ { i } \gamma _ { j } ) = \delta _ { i j } \text { for } i , j = 0 , \dots , n - 1.$ ; confidence 0.218 | ||
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205. https://www.encyclopediaofmath.org/legacyimages/b/b120/b120170/b12017024.png ; $L _ { \alpha } ^ { p }$ ; confidence 0.217 | 205. https://www.encyclopediaofmath.org/legacyimages/b/b120/b120170/b12017024.png ; $L _ { \alpha } ^ { p }$ ; confidence 0.217 | ||
− | 206. https://www.encyclopediaofmath.org/legacyimages/c/c120/c120170/c12017093.png ; $Z ^ { n + 1 } = p ( Z , \overline{Z} ) \equiv \sum _ { 0 \leq i + j \leq n } | + | 206. https://www.encyclopediaofmath.org/legacyimages/c/c120/c120170/c12017093.png ; $Z ^ { n + 1 } = p ( Z , \overline{Z} ) \equiv \sum _ { 0 \leq i + j \leq n } a _ { i j } \overline{Z} ^ { i } Z ^ { j }$ ; confidence 0.217 |
− | 207. https://www.encyclopediaofmath.org/legacyimages/q/q120/q120070/q12007041.png ; $\Delta E = E \bigotimes g + 1 \ | + | 207. https://www.encyclopediaofmath.org/legacyimages/q/q120/q120070/q12007041.png ; $\Delta E = E \bigotimes g + 1 \bigotimes E , \epsilon E = 0 , S E = - E g ^ { - 1 } , \Delta F = F \bigotimes 1 + g ^ { - 1 } \bigotimes F , \epsilon F = 0 , S F = - g F,$ ; confidence 0.217 |
208. https://www.encyclopediaofmath.org/legacyimages/a/a130/a130180/a13018026.png ; $\operatorname{Fm} _ { \cal L }$ ; confidence 0.217 | 208. https://www.encyclopediaofmath.org/legacyimages/a/a130/a130180/a13018026.png ; $\operatorname{Fm} _ { \cal L }$ ; confidence 0.217 | ||
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213. https://www.encyclopediaofmath.org/legacyimages/p/p120/p120150/p12015042.png ; ${\bf R} ^ { n }$ ; confidence 0.217 | 213. https://www.encyclopediaofmath.org/legacyimages/p/p120/p120150/p12015042.png ; ${\bf R} ^ { n }$ ; confidence 0.217 | ||
− | 214. https://www.encyclopediaofmath.org/legacyimages/a/a120/a120080/a12008073.png ; $\left. \begin{cases} { ( \frac { d ^ { 2 } u } { d t ^ { 2 } } , v ) _ { L ^ { 2 } } + a ( u , v ) = ( f ( t ) , v ) _ { L ^ { 2 } } }, \\ { \text { a.e. } t \in [ 0 , T ] , v \in V ,} \\ { u ( 0 ) = u _ { 0 } , \frac { d u } { d t } ( 0 ) = u _ { 1 }. } \end{cases} \right.$ ; confidence 0.217 | + | 214. https://www.encyclopediaofmath.org/legacyimages/a/a120/a120080/a12008073.png ; $\left. \begin{cases} { \left( \frac { d ^ { 2 } u } { d t ^ { 2 } } , v \right) _ { L ^ { 2 } } + a ( u , v ) = ( f ( t ) , v ) _ { L ^ { 2 } } }, \\ { \text { a.e. } t \in [ 0 , T ] , v \in V ,} \\ { u ( 0 ) = u _ { 0 } , \frac { d u } { d t } ( 0 ) = u _ { 1 }. } \end{cases} \right.$ ; confidence 0.217 |
− | 215. https://www.encyclopediaofmath.org/legacyimages/c/c120/c120180/c120180465.png ; $\pi ^ { * _ { 0 }} g \in \ | + | 215. https://www.encyclopediaofmath.org/legacyimages/c/c120/c120180/c120180465.png ; $\pi ^ { * _ { 0 }} g \in \mathsf{S} ^ { 2 } {\cal E} _ { 0 }$ ; confidence 0.217 |
216. https://www.encyclopediaofmath.org/legacyimages/l/l057/l057000/l05700061.png ; $( \lambda x _ { 1 } ( \lambda x _ { 2 } \ldots ( \lambda x _ { n } M ) \ldots ) )$ ; confidence 0.217 | 216. https://www.encyclopediaofmath.org/legacyimages/l/l057/l057000/l05700061.png ; $( \lambda x _ { 1 } ( \lambda x _ { 2 } \ldots ( \lambda x _ { n } M ) \ldots ) )$ ; confidence 0.217 | ||
− | 217. https://www.encyclopediaofmath.org/legacyimages/c/c130/c130130/c13013010.png ; $A = \frac { \partial Q } { \partial L } . \frac { 1 } { 1 - \alpha } . { k } ^ { - \alpha }$ ; confidence 0.216 | + | 217. https://www.encyclopediaofmath.org/legacyimages/c/c130/c130130/c13013010.png ; $A = \frac { \partial Q } { \partial L } . \frac { 1 } { 1 - \alpha } . { k } ^ { - \alpha }.$ ; confidence 0.216 |
218. https://www.encyclopediaofmath.org/legacyimages/d/d120/d120110/d12011012.png ; ${\bf N} \times {\bf N}$ ; confidence 0.216 | 218. https://www.encyclopediaofmath.org/legacyimages/d/d120/d120110/d12011012.png ; ${\bf N} \times {\bf N}$ ; confidence 0.216 | ||
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222. https://www.encyclopediaofmath.org/legacyimages/c/c120/c120300/c12030049.png ; ${\cal T} _ { n }$ ; confidence 0.216 | 222. https://www.encyclopediaofmath.org/legacyimages/c/c120/c120300/c12030049.png ; ${\cal T} _ { n }$ ; confidence 0.216 | ||
− | 223. https://www.encyclopediaofmath.org/legacyimages/b/b120/b120360/b12036025.png ; $= \frac { \operatorname { exp } ( - \frac { ( p _ { x } ^ { 2 } + p _ { y } ^ { 2 } + p _ { z } ^ { 2 } ) } { 2 m k _ { B } T } ) d p _ { x } d p _ { y } d p _ { z } } { \int \int \int _ { - \infty } ^ { \infty } \operatorname { exp } ( \frac { - ( p _ { x } ^ { 2 } + p _ { y } ^ { 2 } + p _ { z } ^ { 2 } ) } { 2 m k _ { B } T } ) d p _ { x } d p _ { y } d p _ { z } }$ ; confidence 0.216 | + | 223. https://www.encyclopediaofmath.org/legacyimages/b/b120/b120360/b12036025.png ; $= \frac { \operatorname { exp } \left( - \frac { \left( p _ { x } ^ { 2 } + p _ { y } ^ { 2 } + p _ { z } ^ { 2 } \right) } { 2 m k _ { B } T } \right) d p _ { x } d p _ { y } d p _ { z } } { \int \int \int _ { - \infty } ^ { \infty } \operatorname { exp } \left( \frac { - \left( p _ { x } ^ { 2 } + p _ { y } ^ { 2 } + p _ { z } ^ { 2 } \right) } { 2 m k _ { B } T } \right) d p _ { x } d p _ { y } d p _ { z } }.$ ; confidence 0.216 |
224. https://www.encyclopediaofmath.org/legacyimages/f/f130/f130100/f130100104.png ; $e \in U$ ; confidence 0.215 | 224. https://www.encyclopediaofmath.org/legacyimages/f/f130/f130100/f130100104.png ; $e \in U$ ; confidence 0.215 | ||
− | 225. https://www.encyclopediaofmath.org/legacyimages/c/c120/c120260/c12026084.png ; $U _ { | + | 225. https://www.encyclopediaofmath.org/legacyimages/c/c120/c120260/c12026084.png ; $U _ { h } ^ { n }$ ; confidence 0.215 |
226. https://www.encyclopediaofmath.org/legacyimages/m/m130/m130200/m13020044.png ; $\langle J ( x ) , X \rangle = j ( X ) ( x ) , H _ { j ( X ) }= \alpha ^ { \prime } ( X ),$ ; confidence 0.215 | 226. https://www.encyclopediaofmath.org/legacyimages/m/m130/m130200/m13020044.png ; $\langle J ( x ) , X \rangle = j ( X ) ( x ) , H _ { j ( X ) }= \alpha ^ { \prime } ( X ),$ ; confidence 0.215 | ||
− | 227. https://www.encyclopediaofmath.org/legacyimages/b/b130/b130070/b1300703.png ; $\operatorname{BS} ( m , n ) = \langle a , b | a ^ { - 1 } b ^ { m } a = b ^ { n } \rangle,$ ; confidence 0.215 | + | 227. https://www.encyclopediaofmath.org/legacyimages/b/b130/b130070/b1300703.png ; $\operatorname{BS} ( m , n ) = \left\langle a , b | a ^ { - 1 } b ^ { m } a = b ^ { n } \right\rangle,$ ; confidence 0.215 |
228. https://www.encyclopediaofmath.org/legacyimages/b/b120/b120090/b12009059.png ; $g ( z ) = z e ^ { \int _ { 0 } ^ { z } \frac { p _ { 0 } ( t ) - 1 } { t } d t } \in S^*,$ ; confidence 0.215 | 228. https://www.encyclopediaofmath.org/legacyimages/b/b120/b120090/b12009059.png ; $g ( z ) = z e ^ { \int _ { 0 } ^ { z } \frac { p _ { 0 } ( t ) - 1 } { t } d t } \in S^*,$ ; confidence 0.215 | ||
Line 470: | Line 470: | ||
235. https://www.encyclopediaofmath.org/legacyimages/e/e130/e130030/e13003081.png ; $\overset{\sim}{\to}\operatorname { Hom } _ { K _ { \infty } } ( \Lambda ^ { \bullet } ( \mathfrak { g } / \mathfrak { k } ) , {\cal C} _ { \infty } ( \Gamma \backslash G ( {\bf R} ) \bigotimes {\cal M} _ {\bf C } ) )$ ; confidence 0.214 | 235. https://www.encyclopediaofmath.org/legacyimages/e/e130/e130030/e13003081.png ; $\overset{\sim}{\to}\operatorname { Hom } _ { K _ { \infty } } ( \Lambda ^ { \bullet } ( \mathfrak { g } / \mathfrak { k } ) , {\cal C} _ { \infty } ( \Gamma \backslash G ( {\bf R} ) \bigotimes {\cal M} _ {\bf C } ) )$ ; confidence 0.214 | ||
− | 236. https://www.encyclopediaofmath.org/legacyimages/w/w120/w120110/w120110134.png ; $\operatorname { sup } _ {\substack{ ( x , \xi ) \in {\bf R} ^ { 2 n }} \\{0<h\leq 1} | + | 236. https://www.encyclopediaofmath.org/legacyimages/w/w120/w120110/w120110134.png ; $\operatorname { sup } _ {\substack{ ( x , \xi ) \in {\bf R} ^ { 2 n }}, \\{0<h\leq 1} } \left| D _ { x } ^ { \alpha } D _ { \xi } ^ { \beta } a ( x , \xi , h ) \right| h ^ { m - | \beta | } < \infty .$ ; confidence 0.214 |
− | 237. https://www.encyclopediaofmath.org/legacyimages/c/c120/c120280/c12028011.png ; $\pi _ { n } ( X _ { n } , X _ { n - 1} , | + | 237. https://www.encyclopediaofmath.org/legacyimages/c/c120/c120280/c12028011.png ; $\pi _ { n } ( X _ { n } , X _ { n - 1} , x )$ ; confidence 0.214 |
238. https://www.encyclopediaofmath.org/legacyimages/z/z130/z130030/z1300305.png ; $Z _ { a } ( f )$ ; confidence 0.214 | 238. https://www.encyclopediaofmath.org/legacyimages/z/z130/z130030/z1300305.png ; $Z _ { a } ( f )$ ; confidence 0.214 | ||
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241. https://www.encyclopediaofmath.org/legacyimages/d/d130/d130060/d130060125.png ; $\operatorname{Bel}_X$ ; confidence 0.214 | 241. https://www.encyclopediaofmath.org/legacyimages/d/d130/d130060/d130060125.png ; $\operatorname{Bel}_X$ ; confidence 0.214 | ||
− | 242. https://www.encyclopediaofmath.org/legacyimages/c/c120/c120180/c120180473.png ; $\tilde{g} \in \ | + | 242. https://www.encyclopediaofmath.org/legacyimages/c/c120/c120180/c120180473.png ; $\tilde{g} \in \mathsf{S} ^ { 2 } \tilde{\cal E}$ ; confidence 0.214 |
243. https://www.encyclopediaofmath.org/legacyimages/f/f040/f040660/f04066036.png ; $S _ { 1 } , \ldots , S _ { m }$ ; confidence 0.214 | 243. https://www.encyclopediaofmath.org/legacyimages/f/f040/f040660/f04066036.png ; $S _ { 1 } , \ldots , S _ { m }$ ; confidence 0.214 | ||
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246. https://www.encyclopediaofmath.org/legacyimages/f/f130/f130190/f13019042.png ; $O ( N ^ { d } \operatorname { log } N )$ ; confidence 0.213 | 246. https://www.encyclopediaofmath.org/legacyimages/f/f130/f130190/f13019042.png ; $O ( N ^ { d } \operatorname { log } N )$ ; confidence 0.213 | ||
− | 247. https://www.encyclopediaofmath.org/legacyimages/d/d120/d120300/d12030047.png ; $\ | + | 247. https://www.encyclopediaofmath.org/legacyimages/d/d120/d120300/d12030047.png ; $\mathsf{E} [ \gamma ( X ( t ) ) | \sigma ( Y ( u , u \leq t ) ] = \frac { \mathsf{E} _ { \mu _ { X } } [ \gamma ( X ( t ) ) \psi ( t ) ] } { \mathsf{E} _ { \mu _ { X } } [ \psi ( t ) ] }.$ ; confidence 0.213 NOTE: it should probably be \sigma ( Y ( u , u \leq t ))] |
248. https://www.encyclopediaofmath.org/legacyimages/c/c120/c120180/c120180475.png ; $\tilde{g} | _ { N _ { 0 } \times \{ 0 \}}$ ; confidence 0.213 | 248. https://www.encyclopediaofmath.org/legacyimages/c/c120/c120180/c120180475.png ; $\tilde{g} | _ { N _ { 0 } \times \{ 0 \}}$ ; confidence 0.213 | ||
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252. https://www.encyclopediaofmath.org/legacyimages/s/s130/s130490/s13049065.png ; $| N _ { 0 } | = | N _ { r(P) } | \leq | N _ { 1 } | = | N _ { r ( P ) - 1} | \leq \dots$ ; confidence 0.213 | 252. https://www.encyclopediaofmath.org/legacyimages/s/s130/s130490/s13049065.png ; $| N _ { 0 } | = | N _ { r(P) } | \leq | N _ { 1 } | = | N _ { r ( P ) - 1} | \leq \dots$ ; confidence 0.213 | ||
− | 253. https://www.encyclopediaofmath.org/legacyimages/b/b120/b120280/b12028018.png ; $g = B . O . \frac { S _ { 1 } } { S _ { 2 } }$ ; confidence 0.213 | + | 253. https://www.encyclopediaofmath.org/legacyimages/b/b120/b120280/b12028018.png ; $g = B . O . \frac { S _ { 1 } } { S _ { 2 } },$ ; confidence 0.213 |
254. https://www.encyclopediaofmath.org/legacyimages/s/s120/s120320/s12032066.png ; $m a = ( - 1 ) ^ { p ( m ) p ( a ) } a m$ ; confidence 0.213 | 254. https://www.encyclopediaofmath.org/legacyimages/s/s120/s120320/s12032066.png ; $m a = ( - 1 ) ^ { p ( m ) p ( a ) } a m$ ; confidence 0.213 | ||
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260. https://www.encyclopediaofmath.org/legacyimages/f/f130/f130210/f13021036.png ; $B ( G ) \cap C _ { 00 } ( G ; {\bf C} )$ ; confidence 0.212 | 260. https://www.encyclopediaofmath.org/legacyimages/f/f130/f130210/f13021036.png ; $B ( G ) \cap C _ { 00 } ( G ; {\bf C} )$ ; confidence 0.212 | ||
− | 261. https://www.encyclopediaofmath.org/legacyimages/w/w120/w120110/w120110137.png ; $( a \ | + | 261. https://www.encyclopediaofmath.org/legacyimages/w/w120/w120110/w120110137.png ; $( a \sharp b ) ( x , \xi ) = r _ { N } ( a , b ) +$ ; confidence 0.212 |
262. https://www.encyclopediaofmath.org/legacyimages/a/a110/a110320/a1103206.png ; $u _ { m + 1 } ^ { ( 1 ) } = u _ { m },$ ; confidence 0.212 | 262. https://www.encyclopediaofmath.org/legacyimages/a/a110/a110320/a1103206.png ; $u _ { m + 1 } ^ { ( 1 ) } = u _ { m },$ ; confidence 0.212 | ||
− | 263. https://www.encyclopediaofmath.org/legacyimages/a/a130/a130040/a130040661.png ; $\ | + | 263. https://www.encyclopediaofmath.org/legacyimages/a/a130/a130040/a130040661.png ; $\mathsf{Me}\operatorname{Mod}{\cal S}_P= \left\{ {\bf M e} _ { {\cal S} _ { P } } {\frak M:M}\in \operatorname{Mod}_{{\cal S}_P} \right\}$ ; confidence 0.212 |
264. https://www.encyclopediaofmath.org/legacyimages/b/b110/b110220/b110220113.png ; $\operatorname{det}_{\bf R} H _ {\cal D } ^ { i + 1 } ( X_{/ \bf R} , {\bf R} ( i + 1 - m ) )$ ; confidence 0.212 | 264. https://www.encyclopediaofmath.org/legacyimages/b/b110/b110220/b110220113.png ; $\operatorname{det}_{\bf R} H _ {\cal D } ^ { i + 1 } ( X_{/ \bf R} , {\bf R} ( i + 1 - m ) )$ ; confidence 0.212 | ||
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268. https://www.encyclopediaofmath.org/legacyimages/a/a130/a130260/a13026026.png ; $q ^ { n }$ ; confidence 0.211 | 268. https://www.encyclopediaofmath.org/legacyimages/a/a130/a130260/a13026026.png ; $q ^ { n }$ ; confidence 0.211 | ||
− | 269. https://www.encyclopediaofmath.org/legacyimages/b/b120/b120270/b12027035.png ; $\ | + | 269. https://www.encyclopediaofmath.org/legacyimages/b/b120/b120270/b12027035.png ; $\mathsf{P} ( X _ { 1 } = a+ n h \text { for some } n= 0,1 , \ldots ) = 1,$ ; confidence 0.211 |
270. https://www.encyclopediaofmath.org/legacyimages/w/w120/w120050/w12005036.png ; ${\cal A} \subset \langle x ^ { 1 } , \ldots , x _ { n } \rangle ^ { 2 }$ ; confidence 0.211 | 270. https://www.encyclopediaofmath.org/legacyimages/w/w120/w120050/w12005036.png ; ${\cal A} \subset \langle x ^ { 1 } , \ldots , x _ { n } \rangle ^ { 2 }$ ; confidence 0.211 | ||
− | 271. https://www.encyclopediaofmath.org/legacyimages/a/a130/a130040/a13004085.png ; $\{ { | + | 271. https://www.encyclopediaofmath.org/legacyimages/a/a130/a130040/a13004085.png ; $\{ \mathfrak{A} , h \}$ ; confidence 0.211 |
272. https://www.encyclopediaofmath.org/legacyimages/h/h130/h130070/h13007044.png ; $\operatorname { deg } f _ { j + r} , \dots , \operatorname { deg } f _ { l } < \operatorname { deg } \Delta = r D.$ ; confidence 0.211 | 272. https://www.encyclopediaofmath.org/legacyimages/h/h130/h130070/h13007044.png ; $\operatorname { deg } f _ { j + r} , \dots , \operatorname { deg } f _ { l } < \operatorname { deg } \Delta = r D.$ ; confidence 0.211 | ||
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297. https://www.encyclopediaofmath.org/legacyimages/b/b120/b120510/b12051082.png ; $\operatorname{bfgsrec}$ ; confidence 0.209 | 297. https://www.encyclopediaofmath.org/legacyimages/b/b120/b120510/b12051082.png ; $\operatorname{bfgsrec}$ ; confidence 0.209 | ||
− | 298. https://www.encyclopediaofmath.org/legacyimages/m/m130/m130080/m13008041.png ; $A ^ { \text{in / out} } ( f ) = \operatorname { lim } _ { t \rightarrow \pm \infty } A _ { f } ^ { t }$ ; confidence 0.209 | + | 298. https://www.encyclopediaofmath.org/legacyimages/m/m130/m130080/m13008041.png ; $A ^ { \text{in/out} } ( f ) = \operatorname { lim } _ { t \rightarrow \pm \infty } A _ { f } ^ { t }$ ; confidence 0.209 |
299. https://www.encyclopediaofmath.org/legacyimages/b/b120/b120370/b12037032.png ; $j _ { 1 } , \dots , j _ { r }$ ; confidence 0.208 | 299. https://www.encyclopediaofmath.org/legacyimages/b/b120/b120370/b12037032.png ; $j _ { 1 } , \dots , j _ { r }$ ; confidence 0.208 | ||
− | 300. https://www.encyclopediaofmath.org/legacyimages/n/n120/n120110/n12011066.png ; $\eta ( y ) = \left\{ \begin{array} { l l } { \operatorname { sup } \{ \xi ( x ) : x \in {\bf R} ^ { n } , \psi ( x ) = y \} , } & { \psi ^ { - 1 } ( y ) \neq \emptyset ,} \\ { 0 , } & { \psi ^ { - 1 } ( y ) = \emptyset .} \end{array} \right.$ ; confidence 0.208 | + | 300. https://www.encyclopediaofmath.org/legacyimages/n/n120/n120110/n12011066.png ; $\eta ( y ) = \left\{ \begin{array} { l l } { \operatorname { sup } \{ \xi ( \underline{x} ) : \underline{x} \in {\bf R} ^ { n } , \psi ( \underline{x} ) = y \} , } & { \psi ^ { - 1 } ( y ) \neq \emptyset ,} \\ { 0 , } & { \psi ^ { - 1 } ( y ) = \emptyset .} \end{array} \right.$ ; confidence 0.208 |
Latest revision as of 10:15, 11 May 2020
List
1. ; $\chi _ { k } ( z )$ ; confidence 0.238
2. ; $l$ ; confidence 0.238
3. ; $n = k r , k r + 1 , \dots,$ ; confidence 0.238
4. ; $r _ { P }$ ; confidence 0.238
5. ; $f ( q , p ) , g ( q , p ) \in S ( {\bf R} ^ { 2 n } )$ ; confidence 0.238
6. ; $f ( x ) = \frac { 1 } { ( 2 \pi ) ^ { 3 / 2 } } \int _ { {\bf R} ^ { 3 } } \hat { f } ( \xi ) u ( x , \xi ) d \xi , \xi : = k\alpha,$ ; confidence 0.238
7. ; $r \leq r_0$ ; confidence 0.238
8. ; $\operatorname{SH} ^ { * } ( M , \omega , \phi _ { 1 } ) \bigotimes \operatorname{SH} ^ { * } ( M , \omega , \phi _ { 2 } ) \rightarrow \operatorname{SH} ^ { * } ( M , \omega , \phi _ { 2 } . \phi _ { 1 } )$ ; confidence 0.238
9. ; $f ( z ) = ( L f ) ( z ) = ( L _ { F_n } f ) ( z ) =$ ; confidence 0.238
10. ; $n_0$ ; confidence 0.237
11. ; $K ^ { n }$ ; confidence 0.237
12. ; $f _ { 1 } , \dots , f _ { m } \in \tilde{\bf Z} [ X _ { 1 } , \dots , X _ { n } ]$ ; confidence 0.237
13. ; $u _ { t } ( x ) = t ^ { - n } u ( x / t )$ ; confidence 0.237
14. ; $H _ { n } ( S ^ { n } )$ ; confidence 0.237
15. ; $c = \operatorname { ad } e _ { - 1 } ^ { p ^ { m } - 1 } ( e _ { p ^ { m } - 2 } ^ { ( p + 1 ) / 2 } )$ ; confidence 0.237
16. ; $a _ { 1 } , \dots , a _ { m }$ ; confidence 0.237
17. ; $\tilde{Y}$ ; confidence 0.237
18. ; $a ( u , v ) = \int _ { \Omega } \left[ \sum _ { i , j = 1 } ^ { m } a _ { i , j } \frac { \partial u } { \partial x _ { i } } \frac { \partial \bar{v} } { \partial x _ { j } } + c ( x ) u \bar{v} \right] d x$ ; confidence 0.237
19. ; $Q_0$ ; confidence 0.237
20. ; $P _ { b }$ ; confidence 0.237
21. ; $a _ { i j } = 0$ ; confidence 0.237
22. ; $\mathsf{S} ^ { 2 } \cal E \subset \otimes ^ { * } E$ ; confidence 0.237
23. ; $a _ { n } = \lambda \theta ^ { n } + \epsilon _ { n }$ ; confidence 0.237
24. ; $h = \sum _ { \mu , \nu } h _ { \mu \nu } ( z ) d z _ { \mu } \bigotimes d \bar{z} _ { \nu },$ ; confidence 0.237
25. ; $P \in {\bf Z} ^ { l }$ ; confidence 0.237
26. ; ${\bf C} ^ { 1 }$ ; confidence 0.237
27. ; $Z ^ { n + k + 1 } = \sum a_{i j } \bar{Z} ^ { i } Z ^ { j + k }$ ; confidence 0.237
28. ; $H ^ { n } ( X ; G ) = \operatorname { lim } _ { \to } H ^ { n } ( \alpha ; G )$ ; confidence 0.237
29. ; $f _ { s \text{l} t } ( x )$ ; confidence 0.237
30. ; $\sum _ { k = 0 } ^ { \infty } \operatorname { exp } ( - \lambda _ { j } t ) \sim ( 4 \pi t ) ^ { - \operatorname { dim } ( M ) / 2 } \sum _ { k = 0 } ^ { \infty } a _ { k } t ^ { k }$ ; confidence 0.237
31. ; $F _ { \mu } ( z ) = \frac { 1 } { 2 \pi } \int _ { - \pi } ^ { \pi } R ( e ^ { i \theta } , z ) d \mu ( \theta )$ ; confidence 0.237
32. ; $+ \sum _ { 1 \leq i < j \leq k } ( - 1 ) ^ { i + j } X \bigotimes [ X , X _ { j } ] \bigwedge$ ; confidence 0.236
33. ; $\psi _ { \mathfrak { A } } ^ { l } e$ ; confidence 0.236
34. ; $E _ { n } ( f ) = \operatorname { inf } _ { c _ { k } } \operatorname { sup } _ { x \in Q } \left| f ( x ) - \sum _ { k = 0 } ^ { n } c _ { k } s _ { k } ( x ) \right| \geq$ ; confidence 0.236
35. ; $R _ { n } \stackrel { \omega } { \rightarrow } R \text { and } \operatorname { lim } _ { \varepsilon \rightarrow 0 } \operatorname { sup } _ { n } \int _ { 0 } ^ { \varepsilon } z R _ { n } ( d z ) = 0,$ ; confidence 0.236
36. ; ${\bf C} ^ { r }$ ; confidence 0.236
37. ; $S \ll ( T / N ) ^ { p } N ^ { q }$ ; confidence 0.236
38. ; $\frac { \Gamma _ { p } \left[ \frac { \delta + n + p - 1 } { 2 } \right] } { ( 2 \pi ) ^ { n p / 2 } | \Sigma | ^ { n / 2 } \Gamma _ { p } \left[ \frac { \delta + p - 1 } { 2 } \right] }.$ ; confidence 0.236
39. ; $| I _ { C } |$ ; confidence 0.236
40. ; $\operatorname { Tr } ( g |_{ V _ n} ) = a _ { n } ( g )$ ; confidence 0.236
41. ; $\hat{T} _ { n } = T _ { n } T _ { 1 } ^ { - 1 } , \hat { u } _ { k } = T _ { 1 } ^ { k } u _ { k },$ ; confidence 0.236
42. ; $( P ( D ) ( \phi ) )_{ \widehat{}} ( \xi ) = P ( \xi ) \widehat { \phi } ( \xi )$ ; confidence 0.235
43. ; $=$ ; confidence 0.235
44. ; $S _ { 1,1 } ^ { 0 }$ ; confidence 0.235
45. ; $\sum _ { i \geq 0 } \left( \begin{array} { c } { m } \\ { i } \end{array} \right) ( u _ { q + i } v ) _ { m + n - i } w =$ ; confidence 0.235
46. ; $\lambda _ { n }$ ; confidence 0.235
47. ; ${\cal P} _{ * } ^ { -\delta }$ ; confidence 0.235
48. ; $\xi _ { n , k }$ ; confidence 0.234
49. ; $x _ { i j } ( a ) x _ {i j } ( b ) = x _ { i j } ( a + b )$ ; confidence 0.234
50. ; $l_{i j}$ ; confidence 0.234
51. ; $e_k$ ; confidence 0.234
52. ; $\dot { u } _ { i } = \tilde { \psi } _ { i } ( U ) + \tilde { \phi } _ { i } ( U ) , \quad i = 1 , \ldots , n,$ ; confidence 0.234
53. ; $\langle {\bf A} , F \rangle$ ; confidence 0.234
54. ; $\operatorname{Re}$ ; confidence 0.234
55. ; $L _ { a } ^ { p } ( G ) = L _ { a } ^ { p }$ ; confidence 0.234
56. ; $\alpha _ { i } \in { k }$ ; confidence 0.234
57. ; $H _ { p } ^ { r } ( M _ { 1 } , \dots , M _ { n } ; \Omega )$ ; confidence 0.233
58. ; $G _ { \text { inn } } = G \cap \operatorname { lnn } ( R )$ ; confidence 0.233
59. ; $| r _ { 1 } | \gg \ldots \gg | r _ { n } |.$ ; confidence 0.233
60. ; $H _ { n + 1}$ ; confidence 0.233
61. ; $\left. \begin{array} { l l l l l l l l l } { 1 } & { 2 } & { 3 } & { 4 } & { } & { 9 } & { 2 } & { 3 } & { 6 } \\ { 5 } & { 6 } & { 7 } & { \square } & { \text { and } } & { 7 } & { 1 } & { 4 } & { \square } \\ { 8 } & { \square } & { \square } & { \square } & { } & { 5 } & { \square } & { \square } & { \square } \\ { 9 } & { \square } & { \square } & { \square } & { } & { 8 } & { \square } & { \square } & { \square } \end{array} \right.$ ; confidence 0.233
62. ; $\tilde { M }$ ; confidence 0.233
63. ; ${\cal K} = {\bf C} ^ { 2 n }$ ; confidence 0.233
64. ; $| x _ { i } | = \operatorname { max } _ { 1 \leq j \leq n } | x _ { j } |$ ; confidence 0.233
65. ; $P _ { n } \approx P _ { n } ^ { \prime }$ ; confidence 0.233
66. ; $\cup _ { i = 1 } ^ { m } A _ { i } \cup ( - A _ { i } ) = S ^ { n }$ ; confidence 0.233
67. ; $P _ { n } = M \left[ \frac { Q _ { n } ( t ) - Q _ { n } ( z ) } { t - z } \right] , n = 0,1 ,\dots .$ ; confidence 0.233
68. ; $L _ { a } ^ { 2 } ( D )$ ; confidence 0.232
69. ; $\delta ^ { * } : H ^ { n } ( \Gamma _ { S ^ { n } } ) \rightarrow H ^ { n + 1 } ( \Gamma _ { \bar{D} \square ^ { n + 1 } } , \Gamma _ { S ^ { n } } )$ ; confidence 0.232
70. ; $H = \vee_{ k _ { 1 } , k _ { 2 } = 0}^\infty A _ { 1 } ^ { k _ { 1 } } A _ { 2 } ^ { k _ { 2 } } \Phi ^ { * } {\cal E}$ ; confidence 0.232
71. ; $u| _ { \partial D } = f$ ; confidence 0.232
72. ; $n = a _ { 1 } + \ldots + a _ { s }$ ; confidence 0.232
73. ; $\Delta x = x \bigotimes 1 + 1 \bigotimes x,$ ; confidence 0.232
74. ; ${\bf Alg}_\models( L _ { n } )$ ; confidence 0.232
75. ; $c ^ { T } \overline{x} + \overline { u } _1^ { T } ( A _ { 1 } \overline{x} - b _ { 1 } ) < \overline { q }$ ; confidence 0.232
76. ; $\Delta \vdash_{\cal D} \varphi$ ; confidence 0.232
77. ; $B _ { i } ( x _ { m } , u , u _ { m } , u _ { m n } : x _ { m } ^ { \prime } , u ^ { \prime } , u _ { m } ^ { \prime } , u _ { m n } ^ { \prime } ) = 0,$ ; confidence 0.231
78. ; $K ( A , {\cal X} ) : 0 \rightarrow \Lambda ^ { 0 } ( {\cal X} ) \stackrel { D _ { A } ^ { 0 } } { \rightarrow } \ldots \stackrel { D _ { A } ^ { n - 1 } } { \rightarrow } \Lambda ^ { n } ( {\cal X} ) \rightarrow 0,$ ; confidence 0.231
79. ; $\sigma _ { \text { lre } } ( T )$ ; confidence 0.231
80. ; $g _ { ab }$ ; confidence 0.231
81. ; $\operatorname { ker } \delta _ { A , B } \subseteq \operatorname { ker } \delta _ { A^* , B^* }$ ; confidence 0.231
82. ; $[ L _ { n } , L _ { m } ] = ( n - m ) L _ { n + m } + \frac { 1 } { 12 } ( n ^ { 3 } - n ) \delta _ { n , - m } . C ^ { \prime },$ ; confidence 0.231
83. ; $e _ { 1 } , \dots , e _ { n } , - ( a _ { 0 } e _ { 1 } + \ldots + a _ { n - 1} e _ { n } )$ ; confidence 0.231
84. ; $P _ { q } ^\# ( n ) = \frac { 1 } { n } \sum _ { r | n } \mu ( r ) q ^ { n / r },$ ; confidence 0.230
85. ; ${\cal I} _ { 0 , \operatorname{loc} } = \{ ( u _ { j } ) _ { j \in \bf N }$ ; confidence 0.230
86. ; $Z _ { 1 } , \dots , Z _ { m }$ ; confidence 0.230
87. ; $A \langle D _ { + } \rangle - A ^ { - 1 } \langle D _ { - } \rangle = ( A ^ { 2 } - A ^ { - 2 } ) \langle D _ { 0 } \rangle$ ; confidence 0.230
88. ; $\Delta \vdash _ {\cal D } \psi$ ; confidence 0.230
89. ; $\square ^ { \prime \prime } \Gamma _ { r k } ^ { t }$ ; confidence 0.230
90. ; $g_1$ ; confidence 0.230
91. ; $\Psi ( \alpha \bigotimes \beta ) = q \beta \bigotimes \alpha,$ ; confidence 0.230
92. ; $ { L } = 1$ ; confidence 0.230
93. ; $( Q _ { n } )$ ; confidence 0.230
94. ; $+\sum _ { i < n + 1 } ( - 1 ) ^ { n + 1 - i } \operatorname { pr }_{ ( \alpha _ { 1 } , \dots , \alpha _ { i + 1 } \alpha _ { i } , \ldots , \alpha _ { n + 1 } ) }+$ ; confidence 0.229
95. ; $\hat { c }_k^1< 0$ ; confidence 0.229
96. ; $\mu _ { n } \rightarrow \infty \quad \text { but } \frac { \mu _ { n } } { n } \rightarrow 0$ ; confidence 0.229
97. ; $D_t^*f = ( 0 , \delta _ { t } \widehat { \bigotimes } f ^ { n } ) _ { n \in \bf N }.$ ; confidence 0.229
98. ; $\left( \begin{array} { c } { a _ { k - 1 } } \\ { k - 1 } \end{array} \right) \leq m - \left( \begin{array} { c } { a _ { k } } \\ { k } \end{array} \right)$ ; confidence 0.229
99. ; $g_{mb , na}$ ; confidence 0.229
100. ; $u _ { q } ( \operatorname{sl} _ { 2 } )$ ; confidence 0.229
101. ; $\tilde { D } = \{ w : w _ { 1 } z _ { 1 } + \ldots + w _ { n } z _ { n } \neq 1 , z \in D \}$ ; confidence 0.229
102. ; $\delta _ { ( 1 ) } < K _ { ( 1 ) } / K _ { ( 2 ) }$ ; confidence 0.229
103. ; $\tilde{\frak E}$ ; confidence 0.229
104. ; $2 ^ { r ( m - 1 ) + 2 m}$ ; confidence 0.229
105. ; $u_i$ ; confidence 0.229
106. ; $\tilde { \chi } ( \xi ) = \frac { 8 \pi } { \xi ^ { 2 } } \operatorname { lim } _ { \varepsilon \downarrow 0 } \int _ { S ^ { 2 } } A ( \theta ^ { \prime } , \alpha ) v _ { \varepsilon } ( \alpha , \theta ) d \alpha,$ ; confidence 0.228
107. ; $t \in {\bf R} ^ { p _ { 1 } n _ { 1 } }$ ; confidence 0.228
108. ; $a ( - k ) = \overline { a ( k ) } , b ( - k ) = \overline { b ( k ) },$ ; confidence 0.228
109. ; $n/m$ ; confidence 0.228
110. ; ${\bf Z} _ { i3 }$ ; confidence 0.228
111. ; $\operatorname { Aut } ( R ) / \operatorname { lnn } ( R ) \cong H$ ; confidence 0.228
112. ; $\sum _ { k } \sum _ { l } \overline { c } _ { k } c _ { l } S ( f _ { k } - \overline { f } _ { l } ) \geq 0$ ; confidence 0.228
113. ; $\Phi ^ { * } ( \xi _ { 1 } \sigma _ { 1 } + \xi _ { 2 } \sigma _ { 2 } ) | _ { \mathfrak { E } ( \lambda ) } : \mathfrak { E } ( \lambda ) \rightarrow \tilde { \mathfrak { E } } ( \lambda ),$ ; confidence 0.228
114. ; $\hat { K } = \{ z \in {\bf C} ^ { n } : | P ( z ) | \leq \| P \| _ { K } , \forall P \in {\cal P} \},$ ; confidence 0.228
115. ; $\operatorname{ bt}$ ; confidence 0.228
116. ; $\theta \rightarrow g \theta = ( g _ { a } ^ { i } d u ^ { a } )$ ; confidence 0.228
117. ; $\operatorname{map}_{ *} ( ., . )$ ; confidence 0.227
118. ; $x _ { 2 } , \dots , x _ { n }$ ; confidence 0.227
119. ; $v \in V_{( n )}$ ; confidence 0.227
120. ; $\tau = 4 \int _ { 0 } ^ { 1 } \int _ { 0 } ^ { 1 } C _ { X , Y } ( u , v ) d C _ { X , Y } ( u , v ) - 1,$ ; confidence 0.227
121. ; $\infty ( L _ { 1 } ) \bigoplus \infty ( L _ { 2 } ) = \infty ( L _ { 2 } ) \bigoplus \infty ( L _ { 1 } ) = \infty ( \emptyset ).$ ; confidence 0.227
122. ; ${\cal A} = - \sum _ { k , \operatorname{l} = 1 } ^ { N } \frac { \partial } { \partial y _ { k } } ( a _ { k \operatorname{l} } ( y ) \frac { \partial } { \partial y_{\operatorname{l}} } ),$ ; confidence 0.226
123. ; $\xi ( ., \dots , . )$ ; confidence 0.226
124. ; $\mu _ { n } ( X )$ ; confidence 0.226
125. ; $\frac { | \nabla ( {\cal A} ) | } { \left( \begin{array} { c } { n } \\ { l + 1 } \end{array} \right) } \geq \frac { | {\cal A} | } { \left( \begin{array} { l } { n } \\ { l } \end{array} \right) }.$ ; confidence 0.226
126. ; $\{ w ( a ) \} _ { a \in A }$ ; confidence 0.226
127. ; $\left( X A _ { 1 } X ^ { \prime } , \ldots , X A _ { s } X ^ { \prime } ) \sim L _ { s } ^ { ( 1 ) } ( f _ { 1 } , \frac { n _ { 1 } } { 2 } , \dots , \frac { n _ { s } } { 2 } \right),$ ; confidence 0.226
128. ; $f _ { \mathfrak { B } }$ ; confidence 0.226
129. ; $\rho : G \rightarrow S p _ { 2 n } ( C ) \rightarrow G l _ { 2 n } ( C )$ ; confidence 0.226
130. ; $e ^ { z }$ ; confidence 0.225
131. ; $f (. , x ) : J \rightarrow {\bf R} ^ { m }$ ; confidence 0.225
132. ; $\operatorname { Mod } ^ { * \text{L}} {\cal D }$ ; confidence 0.225
133. ; $\tilde { \chi } ( \xi )$ ; confidence 0.225
134. ; $a \in \mathfrak { g } ^ { \alpha }$ ; confidence 0.225
135. ; $M _ { n } = m _ { 0 } \ldots m _ { n - 1}$ ; confidence 0.225
136. ; $e_0$ ; confidence 0.225
137. ; ${\cal G} \operatorname{l} _ { Q } ( d ) = \prod _ { j \in Q _ { 0 } } \operatorname{Gl} ( v _ { j } , K )$ ; confidence 0.225
138. ; $\operatorname { inf } _ { z _ { j } } \operatorname { max } _ { k \in S } \left( \frac { | \sum _ { j = 1 } ^ { n } b _ { j } z _ { j } ^ { k } | \psi ( k , n ) } { M _ { d } ( k ) } \right) ^ { 1 / k }$ ; confidence 0.225
139. ; $R _ { n } = \operatorname { min } _ { z _ { j } } \operatorname { max } _ { k = 1 , \ldots , n } | s _ { k } |$ ; confidence 0.225
140. ; $p \in I$ ; confidence 0.224
141. ; $g : {\bf R} _ { + } \times {\bf R} ^ { m } \rightarrow {\cal L} ( {\bf R} ^ { m } , {\bf R}^ { m } )$ ; confidence 0.224
142. ; $\nu _ { 2 } / 2$ ; confidence 0.224
143. ; $\alpha \in {\bf N} _ { 0 } ^ { n }$ ; confidence 0.224
144. ; $\sum _ { j = 1 } ^ { \infty } \lambda _ { j } ^ { - 1 } ( u , \varphi_j ) _ { 0 } \varphi _ { j } ( x ) = \sum _ { j = 1 } ^ { \infty } w _ { j } \varphi _ { j } ( x ) = w ( x )$ ; confidence 0.224
145. ; $\mathsf{P} ( Y (T ) ) \mathsf{P} ( Z < T )$ ; confidence 0.224
146. ; $X _ { i } = Q ( U _ { i } )$ ; confidence 0.224
147. ; $\hat{g}$ ; confidence 0.224
148. ; $K O _ { m } ( {\bf R} \pi ) = {\cal Z} _ { m } ^ { \pi } / i ^ { * } {\cal Z} _ { m + 1 } ^ { \pi }.$ ; confidence 0.224
149. ; $x _ { \nu }$ ; confidence 0.223
150. ; $g \in G$ ; confidence 0.223
151. ; $\kappa$ ; confidence 0.223
152. ; $- \mathsf{E} X ( 1 + o ( 1 ) )$ ; confidence 0.223
153. ; ${\cal B} \rtimes _ { \alpha } {\bf Z} \simeq {\cal O} _ { n } \otimes \cal K$ ; confidence 0.223
154. ; $\operatorname{p.dim } _ { \Lambda } T \leq 1$ ; confidence 0.223
155. ; $f ( x ) \mapsto ( S ^ { \alpha } f ) ( x ) = \int _ { | \xi | \leq 1 } \hat { f} ( \xi ) ( 1 - | \xi | ^ { 2 } ) ^ { \alpha } e ^ { 2 \pi i x . \xi } d \xi, $ ; confidence 0.223
156. ; $\left. \begin{cases}{ U _ { 0 } ( x , y ) = 0 ,}\\{ U _ { 1 } ( x , y ) = 1, }\\{ U _ { n } ( x , y ) = x U _ { n - 1 } ( x , y ) + y U _ { n - 2 } ( x , y ), }\\{ \quad n = 2 , 3 , \ldots ,}\end{cases} \right.$ ; confidence 0.223
157. ; $C \subset \operatorname{Ext} \subset \operatorname{ACS} \subset\operatorname{Conn} \subset D,$ ; confidence 0.223
158. ; $x - a | < b - a$ ; confidence 0.223
159. ; ${\bf a} = ( a _ { 1 } , \dots , a _ { n } ) \in {\bf R} ^ { n } \backslash \{ 0 \}$ ; confidence 0.222
160. ; $X \in \operatorname{ker} \delta _ { A^ * , B ^*}$ ; confidence 0.222
161. ; $\partial _ { x } u$ ; confidence 0.222
162. ; $c ^ { - z }$ ; confidence 0.222
163. ; $\Gamma \vdash N : \sigma$ ; confidence 0.222
164. ; $k = \overline { k } _ { s }$ ; confidence 0.221
165. ; $\sum _ { { m } = 1 } ^ { { n } } m ^ { - s }$ ; confidence 0.221
166. ; $\wedge ^ { n } V$ ; confidence 0.221
167. ; $w _ { 1 } , \dots , w _ { n } \in \Omega$ ; confidence 0.221
168. ; $\operatorname{ev} _ { V } : V ^ { * } \otimes V \rightarrow \underline { 1 }$ ; confidence 0.221
169. ; $\phi = \sum \phi _ { v } : \operatorname{WC} ( A , k ) \rightarrow \sum _ { v } \operatorname{WC} ( A , k _ { v } ),$ ; confidence 0.221
170. ; $= \left\{ \frac { m } { 1 + a ^ { 2 } } \int _ { 0 } ^ { z } \frac { p _ { 1 } ( s ) - a i } { s ^ { 1 - \frac { m } { 1 + a i } } } e ^ { \frac { m } { 1 + a ^ { 2 } } \int _ { 0 } ^ { s } \frac { p _ { 0 } ( t ) - 1 } { t } d t } d s \right\}^{\frac{1+ai}{m}},$ ; confidence 0.221
171. ; $h _ { P }$ ; confidence 0.221
172. ; $\epsilon = \operatorname { max } \mathsf{E} I_A$ ; confidence 0.221
173. ; $n < \aleph_0$ ; confidence 0.221
174. ; $W = \langle A _ { 1 } , \dots , A _ { r } \rangle$ ; confidence 0.221
175. ; $q_Q ( v ) = \operatorname { dim } {\cal G}\operatorname{l} _ { Q } ( v ) - \operatorname { dim } {\cal A} _ { Q } ( v )$ ; confidence 0.221
176. ; $q_{\cal B} : {\bf Z} ^ { n } \rightarrow {\bf Z}$ ; confidence 0.220
177. ; $y _ { n } ^ { * } ( x )$ ; confidence 0.220
178. ; ${\bf Z} _ { \text{tot} S }$ ; confidence 0.220
179. ; $T ^ { 2 } = \frac { Y ^ { 2 } } { \chi _ { n } ^ { 2 } / n } = t _ { n } ^ { 2 },$ ; confidence 0.220
180. ; $\frac { \partial L _ { i } } { \partial x _ { n } } = [ ( L _ { 1 } ^ { n } ) _ { + } , L _ { i } ],$ ; confidence 0.220
181. ; ${\frak h} ^ { * } = \operatorname{Hom} _ {\bf C } ( h , {\bf C} )$ ; confidence 0.220
182. ; $a \leq y _ { 1 } < x _ { 1 } < y _ { 2 } < x _ { 2 } < \ldots < x _ { m } < y _ { m + 1 } \leq b.$ ; confidence 0.220
183. ; $T , \psi \vdash _ {\cal D } \varphi$ ; confidence 0.220
184. ; $T _ { x }$ ; confidence 0.219
185. ; $L ( a , b ) c = \langle a b c \rangle$ ; confidence 0.219
186. ; $\operatorname { span } \{ z ^ { - n - 1 } , \dots , z ^ { - 1 } , 1 , z , \dots , z ^ { n - 1 } \}$ ; confidence 0.219
187. ; $F$ ; confidence 0.219
188. ; $( x_j, y_j )$ ; confidence 0.219
189. ; ${\cal U} _ { \operatorname { p } }$ ; confidence 0.219
190. ; $\operatorname{Bel}: 2 ^ { \Xi } \rightarrow [ 0,1 ]$ ; confidence 0.219
191. ; $\operatorname{sp} _ { U } ( x )$ ; confidence 0.219
192. ; $z ^ { n - 1 } \tilde{x}(z)$ ; confidence 0.219
193. ; $z \mapsto z - 2 \{ a a z \} + \{ a \{ a z a \} a \}$ ; confidence 0.219
194. ; ${\bf M} ( S ) = \int \theta ( x ) d {\cal H} ^ { m } | _ { R ( x ) }$ ; confidence 0.219
195. ; $Z \in {\cal H} _ { n }$ ; confidence 0.218
196. ; $= \frac { 1 } { k ! l ! } \sum _ { \sigma } \operatorname { sign } \sigma \times \times [ K ( X _ { \sigma 1 } , \ldots , X _ { \sigma k } ) , L ( X _ { \sigma ( k + 1 ) } , \ldots , X _ { \sigma ( k + 1 ) } ) ] +$ ; confidence 0.218
197. ; $j _ { r } \circ \phi _ { r } = \phi _ { r + 1 } \circ g _ { r }$ ; confidence 0.218
198. ; $d \mu _ { h }$ ; confidence 0.218
199. ; $a_4$ ; confidence 0.218
200. ; $\frak A$ ; confidence 0.218
201. ; ${\bf l}_1 ( \Gamma )$ ; confidence 0.218
202. ; $\Delta ( A , E ) = \sum _ { i = 0 } ^ { m } I \bigotimes D _ { i , n - i } A ^ { i } E ^ { m - i } = 0.$ ; confidence 0.218
203. ; $\operatorname { sup } _ { x \in K, \atop \xi \in {\bf R} ^ { n } } \left| ( D _ { x } ^ { \alpha } D _ { \xi } ^ { \beta } r _ { m - 2 } ) ( x , \xi ) \right| ( 1 + | \xi | ) ^ { 2 - m + | \beta | } < \infty.$ ; confidence 0.218
204. ; $\operatorname { Tr } _ { E / F } ( \beta _ { i } \gamma _ { j } ) = \delta _ { i j } \text { for } i , j = 0 , \dots , n - 1.$ ; confidence 0.218
205. ; $L _ { \alpha } ^ { p }$ ; confidence 0.217
206. ; $Z ^ { n + 1 } = p ( Z , \overline{Z} ) \equiv \sum _ { 0 \leq i + j \leq n } a _ { i j } \overline{Z} ^ { i } Z ^ { j }$ ; confidence 0.217
207. ; $\Delta E = E \bigotimes g + 1 \bigotimes E , \epsilon E = 0 , S E = - E g ^ { - 1 } , \Delta F = F \bigotimes 1 + g ^ { - 1 } \bigotimes F , \epsilon F = 0 , S F = - g F,$ ; confidence 0.217
208. ; $\operatorname{Fm} _ { \cal L }$ ; confidence 0.217
209. ; $I ( M ) = {\bf l } _ { A } ( M / \mathfrak { q } M ) - e _ { \mathfrak { q } } ^ { 0 } ( M )$ ; confidence 0.217
210. ; $p _ { i,j } ^ { k }$ ; confidence 0.217
211. ; $W ^ { \circ }$ ; confidence 0.217
212. ; $t ( M ; 2,2 ) = 2 ^ { | E | }$ ; confidence 0.217
213. ; ${\bf R} ^ { n }$ ; confidence 0.217
214. ; $\left. \begin{cases} { \left( \frac { d ^ { 2 } u } { d t ^ { 2 } } , v \right) _ { L ^ { 2 } } + a ( u , v ) = ( f ( t ) , v ) _ { L ^ { 2 } } }, \\ { \text { a.e. } t \in [ 0 , T ] , v \in V ,} \\ { u ( 0 ) = u _ { 0 } , \frac { d u } { d t } ( 0 ) = u _ { 1 }. } \end{cases} \right.$ ; confidence 0.217
215. ; $\pi ^ { * _ { 0 }} g \in \mathsf{S} ^ { 2 } {\cal E} _ { 0 }$ ; confidence 0.217
216. ; $( \lambda x _ { 1 } ( \lambda x _ { 2 } \ldots ( \lambda x _ { n } M ) \ldots ) )$ ; confidence 0.217
217. ; $A = \frac { \partial Q } { \partial L } . \frac { 1 } { 1 - \alpha } . { k } ^ { - \alpha }.$ ; confidence 0.216
218. ; ${\bf N} \times {\bf N}$ ; confidence 0.216
219. ; $H ^ { n , n - 1 } ( {\bf C} ^ { n } \backslash D )$ ; confidence 0.216
220. ; $( f , \phi ) ^ { \leftarrow } ( b ) = \phi ^ { \text{op} } \circ b \circ f$ ; confidence 0.216
221. ; $X \subseteq { Q }$ ; confidence 0.216
222. ; ${\cal T} _ { n }$ ; confidence 0.216
223. ; $= \frac { \operatorname { exp } \left( - \frac { \left( p _ { x } ^ { 2 } + p _ { y } ^ { 2 } + p _ { z } ^ { 2 } \right) } { 2 m k _ { B } T } \right) d p _ { x } d p _ { y } d p _ { z } } { \int \int \int _ { - \infty } ^ { \infty } \operatorname { exp } \left( \frac { - \left( p _ { x } ^ { 2 } + p _ { y } ^ { 2 } + p _ { z } ^ { 2 } \right) } { 2 m k _ { B } T } \right) d p _ { x } d p _ { y } d p _ { z } }.$ ; confidence 0.216
224. ; $e \in U$ ; confidence 0.215
225. ; $U _ { h } ^ { n }$ ; confidence 0.215
226. ; $\langle J ( x ) , X \rangle = j ( X ) ( x ) , H _ { j ( X ) }= \alpha ^ { \prime } ( X ),$ ; confidence 0.215
227. ; $\operatorname{BS} ( m , n ) = \left\langle a , b | a ^ { - 1 } b ^ { m } a = b ^ { n } \right\rangle,$ ; confidence 0.215
228. ; $g ( z ) = z e ^ { \int _ { 0 } ^ { z } \frac { p _ { 0 } ( t ) - 1 } { t } d t } \in S^*,$ ; confidence 0.215
229. ; $\Phi ^ { * } ( t ) = \int _ { 0 } ^ {| t | } g _ { \Phi } ( s ) d s$ ; confidence 0.214
230. ; $\langle {\bf M e} _ { {\cal S} _ { P } } ^ { * \text{L} } \mathfrak { M } , F _ { {\cal S} _ { P } } ^ { * \text{L} } \mathfrak { M } \rangle$ ; confidence 0.214
231. ; $L _ { p } ( {\bf R} ^ { n } )$ ; confidence 0.214
232. ; $\operatorname{Alg} \operatorname{Mod}^{*\text{L}} \cal DS$ ; confidence 0.214
233. ; $\omega \mathfrak { g } ^ { \alpha } = \mathfrak { g } ^ { - \alpha}$ ; confidence 0.214
234. ; $( 0 , \kappa _ { a} )$ ; confidence 0.214
235. ; $\overset{\sim}{\to}\operatorname { Hom } _ { K _ { \infty } } ( \Lambda ^ { \bullet } ( \mathfrak { g } / \mathfrak { k } ) , {\cal C} _ { \infty } ( \Gamma \backslash G ( {\bf R} ) \bigotimes {\cal M} _ {\bf C } ) )$ ; confidence 0.214
236. ; $\operatorname { sup } _ {\substack{ ( x , \xi ) \in {\bf R} ^ { 2 n }}, \\{0<h\leq 1} } \left| D _ { x } ^ { \alpha } D _ { \xi } ^ { \beta } a ( x , \xi , h ) \right| h ^ { m - | \beta | } < \infty .$ ; confidence 0.214
237. ; $\pi _ { n } ( X _ { n } , X _ { n - 1} , x )$ ; confidence 0.214
238. ; $Z _ { a } ( f )$ ; confidence 0.214
239. ; $K$ ; confidence 0.214
240. ; $\{ a , b \} = h ( a b ) h ( a ) ^ { - 1 } h ( b ) ^ { - 1 }$ ; confidence 0.214
241. ; $\operatorname{Bel}_X$ ; confidence 0.214
242. ; $\tilde{g} \in \mathsf{S} ^ { 2 } \tilde{\cal E}$ ; confidence 0.214
243. ; $S _ { 1 } , \ldots , S _ { m }$ ; confidence 0.214
244. ; $+\frac { 1 } { 2 } \int _ { {\bf R} ^ { 3 } } \int _ { {\bf R} ^ { 3 } } \frac { \rho ( x ) \rho ( y ) } { | x - y | } d x d y + U$ ; confidence 0.214
245. ; $A \in M _ { m \times n } ( K ) \subset M _ { m \times n } ( \tilde { K } )$ ; confidence 0.213
246. ; $O ( N ^ { d } \operatorname { log } N )$ ; confidence 0.213
247. ; $\mathsf{E} [ \gamma ( X ( t ) ) | \sigma ( Y ( u , u \leq t ) ] = \frac { \mathsf{E} _ { \mu _ { X } } [ \gamma ( X ( t ) ) \psi ( t ) ] } { \mathsf{E} _ { \mu _ { X } } [ \psi ( t ) ] }.$ ; confidence 0.213 NOTE: it should probably be \sigma ( Y ( u , u \leq t ))]
248. ; $\tilde{g} | _ { N _ { 0 } \times \{ 0 \}}$ ; confidence 0.213
249. ; $\lambda x M$ ; confidence 0.213
250. ; ${\frak sl} ( n , {\bf C} )$ ; confidence 0.213
251. ; $O (n \operatorname{log} ^ { 2 } n )$ ; confidence 0.213
252. ; $| N _ { 0 } | = | N _ { r(P) } | \leq | N _ { 1 } | = | N _ { r ( P ) - 1} | \leq \dots$ ; confidence 0.213
253. ; $g = B . O . \frac { S _ { 1 } } { S _ { 2 } },$ ; confidence 0.213
254. ; $m a = ( - 1 ) ^ { p ( m ) p ( a ) } a m$ ; confidence 0.213
255. ; ${\bf l} ( t , x )$ ; confidence 0.213
256. ; $\sum _ { l = 0 } ^ { m } ( I _ { m } \bigotimes D _ { m - i } ) [ A _ { 1 } ^ { i + 1 } , A _ { 1 } ^ { i } A _ { 2 } ] = 0 ( D _ { 0 } = I _ { n } ).$ ; confidence 0.213
257. ; $j = 0 , \dots , N$ ; confidence 0.213
258. ; $\tilde{x}_-$ ; confidence 0.213
259. ; $U = \sum _ { u } u ( u - 1 ) / 2$ ; confidence 0.213
260. ; $B ( G ) \cap C _ { 00 } ( G ; {\bf C} )$ ; confidence 0.212
261. ; $( a \sharp b ) ( x , \xi ) = r _ { N } ( a , b ) +$ ; confidence 0.212
262. ; $u _ { m + 1 } ^ { ( 1 ) } = u _ { m },$ ; confidence 0.212
263. ; $\mathsf{Me}\operatorname{Mod}{\cal S}_P= \left\{ {\bf M e} _ { {\cal S} _ { P } } {\frak M:M}\in \operatorname{Mod}_{{\cal S}_P} \right\}$ ; confidence 0.212
264. ; $\operatorname{det}_{\bf R} H _ {\cal D } ^ { i + 1 } ( X_{/ \bf R} , {\bf R} ( i + 1 - m ) )$ ; confidence 0.212
265. ; $\Lambda _ { m } ^ { \alpha , \beta , r , s }$ ; confidence 0.212
266. ; $\frac { G ( x , t ) } { ( x - x _ { 1 } ) ^ { r_1} \ldots ( x - x _ { m } ) ^ { r _ { m } } } > 0$ ; confidence 0.212
267. ; $\geq | z _ { k_1 } + 1 | \geq \ldots \geq | z _ { k } | = 1 \geq \ldots \geq | z _ { k _ { 2 } } - 1 | > > \frac { m } { m + n } \geq | z _ { k _ { 2 } } | \geq \ldots \geq | z _ { n } |.$ ; confidence 0.211
268. ; $q ^ { n }$ ; confidence 0.211
269. ; $\mathsf{P} ( X _ { 1 } = a+ n h \text { for some } n= 0,1 , \ldots ) = 1,$ ; confidence 0.211
270. ; ${\cal A} \subset \langle x ^ { 1 } , \ldots , x _ { n } \rangle ^ { 2 }$ ; confidence 0.211
271. ; $\{ \mathfrak{A} , h \}$ ; confidence 0.211
272. ; $\operatorname { deg } f _ { j + r} , \dots , \operatorname { deg } f _ { l } < \operatorname { deg } \Delta = r D.$ ; confidence 0.211
273. ; $\exists y \forall v ( ( v \in x \bigwedge ( \neg v = \emptyset ) ) \rightarrow \exists s \forall t ( ( t \in v \bigwedge t \in y ) \leftrightarrow s = t ) ).$ ; confidence 0.211
274. ; $R = k [ x _ { 1 } , \dots , x _ { n } ] / I$ ; confidence 0.211
275. ; $v \in {\bf N} ^ { n }$ ; confidence 0.211
276. ; $\phi ( . , \eta ) Y \square \text{ periodic}.$ ; confidence 0.211
277. ; $\tilde { \mathcal { Q } } = \tilde { \mathcal { Q } } ( D ^ { n } )$ ; confidence 0.211
278. ; $\lambda \bf x I$ ; confidence 0.210
279. ; $t _ { N } ( a , b ) \in S _ { \text{scl} } ^ { m _ { 1 } + m _ { 2 } - N }$ ; confidence 0.210
280. ; $Q _ { n } ( z ) / T _ { n } ( z ) \rightrightarrows 2 / \phi ^ { \prime } ( z )$ ; confidence 0.210
281. ; $\gamma _ { 0 } \in \Gamma _ { m }$ ; confidence 0.210
282. ; $e_{ii} - e_{i + 1 i + 1}$ ; confidence 0.210
283. ; $C(m\operatorname{log} n) ^{1 / \alpha}$ ; confidence 0.210
284. ; $ { k } _ { \pi }$ ; confidence 0.210
285. ; ${\cal Q} ( \Omega ) = \tilde {\cal O } ( U \# \Omega ) / \sum _ { j = 1 } ^ { n } \tilde {\cal O } ( U \#_j \Omega ),$ ; confidence 0.210
286. ; $S = \operatorname{Spec} k$ ; confidence 0.210
287. ; $M _ { A , B}$ ; confidence 0.210
288. ; $\{ w ^ { 1 } , \dots , w ^ { q } \} \subset A ^ { n }$ ; confidence 0.210
289. ; $d_{x , \xi} p _ { m } ( x , \xi ) = 0$ ; confidence 0.209
290. ; $\widehat{\Gamma}$ ; confidence 0.209
291. ; $F _ { n } = F _ { n - 1} + F _ { n - 2}$ ; confidence 0.209
292. ; $X _ { i } \in \operatorname { sl } _ { 2 } ( {\bf C} )$ ; confidence 0.209
293. ; $b \in P$ ; confidence 0.209
294. ; $\| \varphi \| _ { L ^ { 2 } ( \mu ) } ^ { 2 } = \sum _ { n = 0 } ^ { \infty } n ! | g _ { n } | _ { L^2 ( [ 0,1 ] ^ { n } ) } ^ { 2 } .$ ; confidence 0.209
295. ; $\Theta = \left( \begin{array} { l l l } { T } & { K } & { J } \\ { \mathfrak { H } } & { \square } & { \mathfrak{E} } \end{array} \right)$ ; confidence 0.209
296. ; $c_l$ ; confidence 0.209
297. ; $\operatorname{bfgsrec}$ ; confidence 0.209
298. ; $A ^ { \text{in/out} } ( f ) = \operatorname { lim } _ { t \rightarrow \pm \infty } A _ { f } ^ { t }$ ; confidence 0.209
299. ; $j _ { 1 } , \dots , j _ { r }$ ; confidence 0.208
300. ; $\eta ( y ) = \left\{ \begin{array} { l l } { \operatorname { sup } \{ \xi ( \underline{x} ) : \underline{x} \in {\bf R} ^ { n } , \psi ( \underline{x} ) = y \} , } & { \psi ^ { - 1 } ( y ) \neq \emptyset ,} \\ { 0 , } & { \psi ^ { - 1 } ( y ) = \emptyset .} \end{array} \right.$ ; confidence 0.208
Maximilian Janisch/latexlist/latex/NoNroff/71. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Maximilian_Janisch/latexlist/latex/NoNroff/71&oldid=45687