Namespaces
Variants
Actions

Difference between revisions of "User:Maximilian Janisch/latexlist/latex"

From Encyclopedia of Mathematics
Jump to: navigation, search
(Created page)
 
(AUTOMATIC EDIT: Updated image/latex database (currently 103285 images indexed; order by duplicates, reverse: True.)
Line 2: Line 2:
  
 
== List ==
 
== List ==
<img src ="https://www.encyclopediaofmath.org/legacyimages/t/t120/t120010/t120010129.png" /> : $15$
+
# 41 duplicate(s) ; https://www.encyclopediaofmath.org/legacyimages/d/d030/d030020/d03002056.png ; $D x$ ; confidence 0.7125899824424232
(confidence 1.00)
+
# 14 duplicate(s) ; https://www.encyclopediaofmath.org/legacyimages/b/b120/b120140/b12014039.png ; $a ( z )$ ; confidence 0.9482394098353333
 
+
# 6 duplicate(s) ; https://www.encyclopediaofmath.org/legacyimages/c/c110/c110170/c1101705.png ; $D _ { p }$ ; confidence 0.949111588895238
<img src ="https://www.encyclopediaofmath.org/legacyimages/t/t120/t120010/t120010143.png" /> : $15$
+
# 6 duplicate
(confidence 1.00)
 
 
 
<img src ="https://www.encyclopediaofmath.org/legacyimages/t/t120/t120010/t12001078.png" /> : $1$
 
(confidence 1.00)
 
 
 
<img src ="https://www.encyclopediaofmath.org/legacyimages/t/t120/t120010/t120010134.png" /> : $( 4 n + 3 )$
 
(confidence 1.00)
 
 
 
<img src ="https://www.encyclopediaofmath.org/legacyimages/t/t120/t120010/t120010151.png" /> : $4 n + 3$
 
(confidence 1.00)
 
 
 
<img src ="https://www.encyclopediaofmath.org/legacyimages/t/t120/t120010/t120010118.png" /> : $4 n + 3$
 
(confidence 1.00)
 
 
 
<img src ="https://www.encyclopediaofmath.org/legacyimages/t/t120/t120010/t120010126.png" /> : $11$
 
(confidence 1.00)
 
 
 
<img src ="https://www.encyclopediaofmath.org/legacyimages/t/t120/t120010/t120010115.png" /> : $11$
 
(confidence 1.00)
 
 
 
<img src ="https://www.encyclopediaofmath.org/legacyimages/t/t120/t120010/t120010142.png" /> : $11$
 
(confidence 1.00)
 
 
 
<img src ="https://www.encyclopediaofmath.org/legacyimages/t/t120/t120010/t120010149.png" /> : $2$
 
(confidence 1.00)
 
 
 
<img src ="https://www.encyclopediaofmath.org/legacyimages/t/t120/t120010/t12001074.png" /> : $2$
 
(confidence 1.00)
 
 
 
<img src ="https://www.encyclopediaofmath.org/legacyimages/t/t120/t120010/t120010146.png" /> : $7$
 
(confidence 1.00)
 
 
 
<img src ="https://www.encyclopediaofmath.org/legacyimages/t/t120/t120010/t120010141.png" /> : $7$
 
(confidence 1.00)
 
 
 
<img src ="https://www.encyclopediaofmath.org/legacyimages/t/t120/t120010/t120010156.png" /> : $7$
 
(confidence 1.00)
 
 
 
<img src ="https://www.encyclopediaofmath.org/legacyimages/t/t120/t120010/t12001021.png" /> : $m = 4 n + 3$
 
(confidence 1.00)
 
 
 
<img src ="https://www.encyclopediaofmath.org/legacyimages/t/t120/t120010/t12001094.png" /> : $n + 2$
 
(confidence 1.00)
 
 
 
<img src ="https://www.encyclopediaofmath.org/legacyimages/t/t120/t120010/t12001077.png" /> : $\xi ( \tau )$
 
(confidence 1.00)
 
 
 
<img src ="https://www.encyclopediaofmath.org/legacyimages/a/a010/a010020/a01002013.png" /> : $\sigma \delta$
 
(confidence 1.00)
 
 
 
<img src ="https://www.encyclopediaofmath.org/legacyimages/t/t120/t120010/t120010130.png" /> : $b _ { 2 } \neq b _ { 6 }$
 
(confidence 1.00)
 
 
 
<img src ="https://www.encyclopediaofmath.org/legacyimages/t/t120/t120010/t120010159.png" /> : $4 n$
 
(confidence 1.00)
 
 
 
<img src ="https://www.encyclopediaofmath.org/legacyimages/t/t120/t120010/t12001070.png" /> : $\tau = ( \tau _ { 1 } , \tau _ { 2 } , \tau _ { 3 } ) \in R ^ { 3 }$
 
(confidence 1.00)
 
 
 
<img src ="https://www.encyclopediaofmath.org/legacyimages/a/a130/a130010/a13001016.png" /> : $B ^ { A } \cong ( A ^ { * } \otimes B )$
 
(confidence 1.00)
 
 
 
<img src ="https://www.encyclopediaofmath.org/legacyimages/t/t120/t120010/t12001049.png" /> : $\{ \xi ^ { 1 } , \xi ^ { 2 } , \xi ^ { 3 } \}$
 
(confidence 1.00)
 
 
 
<img src ="https://www.encyclopediaofmath.org/legacyimages/t/t120/t120010/t12001053.png" /> : $\{ \xi ^ { 1 } , \xi ^ { 2 } , \xi ^ { 3 } \}$
 
(confidence 1.00)
 
 
 
<img src ="https://www.encyclopediaofmath.org/legacyimages/t/t120/t120010/t12001031.png" /> : $\{ \xi ^ { 1 } , \xi ^ { 2 } , \xi ^ { 3 } \}$
 
(confidence
 

Revision as of 09:12, 8 April 2019

All known classifications (needs to be organized by duplicates):

List

  1. 41 duplicate(s) ; d03002056.png ; $D x$ ; confidence 0.7125899824424232
  2. 14 duplicate(s) ; b12014039.png ; $a ( z )$ ; confidence 0.9482394098353333
  3. 6 duplicate(s) ; c1101705.png ; $D _ { p }$ ; confidence 0.949111588895238
  4. 6 duplicate(s) ; c0257107.png ; $U = U ( x _ { 0 } )$ ; confidence 0.9908562078219828
  5. 6 duplicate(s) ; i0520106.png ; $D _ { 1 } , \ldots , D _ { n }$ ; confidence 0.4988053123602627
  6. 5 duplicate(s) ; a01137073.png ; $\{ U _ { i } \}$ ; confidence 0.9836893369850943
  7. 5 duplicate(s) ; i05023059.png ; $1 < m \leq n$ ; confidence 0.7369614629370724
  8. 4 duplicate(s) ; b13002056.png ; $x \in J$ ; confidence 0.9080545659315307
  9. 3 duplicate(s) ; b01729088.png ; $A = R ( X )$ ; confidence 0.9881159073610419
  10. 3 duplicate(s) ; i051150191.png ; $p ^ { t } ( . )$ ; confidence 0.8165592987790539
  11. 3 duplicate(s) ; d130080108.png ; $F \in Hol ( D )$ ; confidence 0.8050535485710892
  12. 3 duplicate(s) ; c12007011.png ; $1 \leq i \leq n - 1$ ; confidence 0.9934317899899957
  13. 3 duplicate(s) ; i05250047.png ; $P ^ { N } ( k )$ ; confidence 0.9987133323048683
  14. 2 duplicate(s) ; f03838022.png ; $C _ { 0 }$ ; confidence 0.8004815244538365
  15. 2 duplicate(s) ; r082060128.png ; $2 g - 1$ ; confidence 0.9989153310543109
  16. 2 duplicate(s) ; a01095099.png ; $X = \xi ^ { i }$ ; confidence 0.6624091170439768
  17. 2 duplicate(s) ; c11044082.png ; $C ( n ) = 0$ ; confidence 0.9997444185828339
  18. 2 duplicate(s) ; i13005080.png ; $s > - \infty$ ; confidence 0.9845208310112613
  19. 1 duplicate(s) ; b13020087.png ; $[ \mathfrak { g } ^ { \alpha } , \mathfrak { g } ^ { \beta } ] \subset \mathfrak { g } ^ { \alpha + \beta }$ ; confidence 0.9810343462221086
  20. 1 duplicate(s) ; p0737503.png ; $p _ { i } ( \xi ) \in H ^ { 4 i } ( B )$ ; confidence 0.99791358427467
  21. 1 duplicate(s) ; s12028015.png ; $\overline { E } * ( X )$ ; confidence 0.5537829111373315
  22. 1 duplicate(s) ; e03556014.png ; $y ^ { \prime } ( 0 ) = 0$ ; confidence 0.9903064442155347
  23. 1 duplicate(s) ; w0973508.png ; $A = N \oplus s$ ; confidence 0.5210690864049642
  24. 1 duplicate(s) ; s0871708.png ; $\Delta ^ { n } = \{ ( t _ { 0 } , \ldots , t _ { k } + 1 ) : 0 \leq t _ { i } \leq 1 , \sum t _ { i } = 1 \} \subset R ^ { n + 1 }$ ; confidence 0.11326702391691568
  25. 1 duplicate(s) ; b1104407.png ; $\overline { \Xi } \epsilon = 0$ ; confidence 0.3260247782643509
  26. 1 duplicate(s) ; x120010101.png ; $\operatorname { Aut } ( R ) / \operatorname { ln } n ( R ) \cong H$ ; confidence 0.22810850082016165
  27. 1 duplicate(s) ; v0967406.png ; $v _ { \nu } ( t _ { 0 } ) = 0$ ; confidence 0.9958144597610641
  28. 1 duplicate(s) ; c02583071.png ; $i B _ { 0 }$ ; confidence 0.9980735616545853
  29. 1 duplicate(s) ; r11008062.png ; $\lambda _ { j , k }$ ; confidence 0.9635983039923848
  30. 1 duplicate(s) ; k11003029.png ; $\frac { x ^ { \rho + 1 } f ( x ) } { \int _ { x } ^ { x } t ^ { \sigma } f ( t ) d t } \rightarrow \sigma + \rho + 1 \quad ( x \rightarrow \infty )$ ; confidence 0.3200898597640655
  31. 1 duplicate(s) ; m062620248.png ; $x > y > z$ ; confidence 0.9993955133881784
  32. 1 duplicate(s) ; m06233085.png ; $\{ 1,2 , \dots \}$ ; confidence 0.5933353086312023
  33. 1 duplicate(s) ; z13001018.png ; $| z | > \operatorname { max } \{ R _ { 1 } , R _ { 2 } \}$ ; confidence 0.3553260162210176
  34. 1 duplicate(s) ; l06116099.png ; $V _ { 0 } \subset E$ ; confidence 0.9785935677225964
  35. 1 duplicate(s) ; t13014089.png ; $Q _ { 0 } = \{ 1 , \dots , n \}$ ; confidence 0.774493022175851
  36. 1 duplicate(s) ; l057000153.png ; $+ ( \lambda x y \cdot y ) : ( \sigma \rightarrow ( \tau \rightarrow \tau ) )$ ; confidence 0.26240483068240167
  37. 1 duplicate(s) ; b01540091.png ; $\Psi _ { 1 } ( Y ) / \hat { q } ( Y ) \leq \psi ( Y ) \leq \Psi _ { 2 } ( Y ) / \hat { q } ( Y )$ ; confidence 0.23609599825199817
  38. 1 duplicate(s) ; n06784093.png ; $A \in L _ { \infty } ( H )$ ; confidence 0.9935492544546415
  39. 1 duplicate(s) ; m13002013.png ; $F _ { A } = * D _ { A } \phi$ ; confidence 0.7384051116139154
  40. 1 duplicate(s) ; n12011031.png ; $x \in K$ ; confidence 0.6579697488518514
  41. 1 duplicate(s) ; c02094024.png ; $\operatorname { det } X ( \theta , \tau ) = \operatorname { exp } \int ^ { \theta } \operatorname { tr } A ( \xi ) d \xi$ ; confidence 0.8011337035503415
  42. 1 duplicate(s) ; h0484501.png ; $z ( 1 - z ) w ^ { \prime \prime } + [ \gamma - ( \alpha + \beta + 1 ) z ] w ^ { \prime } - \alpha \beta w = 0$ ; confidence 0.9956682138248338
  43. 1 duplicate(s) ; w09745039.png ; $j = g ^ { 3 } / g ^ { 2 }$ ; confidence 0.7991474537469944
  44. 1 duplicate(s) ; s085590228.png ; $R = \{ R _ { 1 } > 0 , \dots , R _ { n } > 0 \}$ ; confidence 0.5913209005341337
  45. 1 duplicate(s) ; s09167062.png ; $S ( B _ { n } ^ { m } )$ ; confidence 0.7188991353542298
  46. 1 duplicate(s) ; s0833306.png ; $\phi _ { \mathscr { A } } ( . )$ ; confidence 0.19347190705537826
  47. 1 duplicate(s) ; b12027050.png ; $U ( t ) = \sum _ { 1 } ^ { \infty } P ( S _ { k } \leq t ) = \sum _ { 1 } ^ { \infty } F ^ { ( k ) } ( t )$ ; confidence 0.9173784852068905
  48. 1 duplicate(s) ; m13025061.png ; $\int | \rho _ { \varepsilon } ( x ) | d x$ ; confidence 0.964771564499889
  49. 1 duplicate(s) ; u09570015.png ; $D ( D , G - ) : C \rightarrow$ ; confidence 0.39755631559394916
  50. 1 duplicate(s) ; c02237063.png ; $Q / Z$ ; confidence 0.663649051291889
  51. 1 duplicate(s) ; d03185094.png ; $( \operatorname { arccos } x ) ^ { \prime } = - 1 / \sqrt { 1 - x ^ { 2 } }$ ; confidence 0.9962210404610826
  52. 1 duplicate(s) ; u09541052.png ; $g ^ { p } = e$ ; confidence 0.9783864254422098
  53. 1 duplicate(s) ; r082200179.png ; $\rho _ { M _ { 1 } } ( X , Y ) \geq \rho _ { M _ { 2 } } ( \phi ( X ) , \phi ( Y ) )$ ; confidence 0.6746325376340707
  54. 1 duplicate(s) ; f0412109.png ; $A / \eta$ ; confidence 0.7016005337400021
  55. 1 duplicate(s) ; l13001029.png ; $S _ { N } ( f ; x ) = \sum _ { k | \leq N } \hat { f } ( k ) e ^ { i k x }$ ; confidence 0.6326879749735163
  56. 1 duplicate(s) ; k056010135.png ; $p : X \rightarrow S$ ; confidence 0.9979840368620039
  57. 1 duplicate(s) ; c020540218.png ; $\nabla ^ { \prime } = \nabla$ ; confidence 0.998307629684964
  58. 1 duplicate(s) ; r08232050.png ; $\operatorname { lim } _ { r \rightarrow 1 } \int _ { E } | f ( r e ^ { i \theta } ) | ^ { \delta } d \theta = \int _ { E } | f ( e ^ { i \theta } ) | ^ { \delta } d \theta$ ; confidence 0.9636735762236702
  59. 1 duplicate(s) ; i05294039.png ; $F _ { t } : M ^ { n } \rightarrow M ^ { n }$ ; confidence 0.9892303983467674
  60. 1 duplicate(s) ; c02152013.png ; $V ( \Lambda ^ { \prime } ) \otimes V ( \Lambda ^ { \prime \prime } )$ ; confidence 0.9956682193198153
  61. 1 duplicate(s) ; t0935701.png ; $x = \pm \alpha \operatorname { ln } \frac { \alpha + \sqrt { \alpha ^ { 2 } - y ^ { 2 } } } { y } - \sqrt { \alpha ^ { 2 } - y ^ { 2 } }$ ; confidence 0.3913006402000813
  62. 1 duplicate(s) ; l057050165.png ; $a \rightarrow a b d ^ { 6 }$ ; confidence 0.5686678070129293
  63. 1 duplicate(s) ; b01757027.png ; $E \mu _ { X , t } ( G ) \approx K e ^ { ( \alpha - \lambda _ { 1 } ) t } \phi _ { 1 } ( x )$ ; confidence 0.2070610832487361
  64. 1 duplicate(s) ; d031850261.png ; $\partial z / \partial y = f ^ { \prime } ( x , y )$ ; confidence 0.43958333682472145
  65. 1 duplicate(s) ; r0777407.png ; $F ( u ) = - \lambda ( u - \frac { u ^ { 2 } } { 3 } ) , \quad \lambda =$ ; confidence 0.7430177844611311
  66. 1 duplicate(s) ; f12024048.png ; $\dot { x } ( t ) = f ( t , x _ { t } )$ ; confidence 0.5429682760018246
  67. 1 duplicate(s) ; i13007010.png ; $q ( x ) \in L ^ { 2 } \operatorname { loc } ( R ^ { 3 } )$ ; confidence 0.9533661981123269
  68. 1 duplicate(s) ; b01734036.png ; $+ \int _ { \partial S } \mu ( t ) d t + i c , \quad \text { if } m \geq 1$ ; confidence 0.9868991488845216
  69. 1 duplicate(s) ; c02211060.png ; $\xi _ { 1 } ^ { 2 } + \ldots + \xi _ { k - m - 1 } ^ { 2 } + \mu _ { 1 } \xi _ { k - m } ^ { 2 } + \ldots + \mu _ { m } \xi _ { k - 1 } ^ { 2 }$ ; confidence 0.818133040173671
  70. 1 duplicate(s) ; k05594036.png ; $\eta ( \epsilon ) \rightarrow 0$ ; confidence 0.9930945383534938
  71. 1 duplicate(s) ; t094300134.png ; $\operatorname { Fix } ( T ) \subset \mathfrak { R }$ ; confidence 0.7097136892515409
  72. 1 duplicate(s) ; k0558502.png ; $K = ( S , R , D , W )$ ; confidence 0.9948102230937678
  73. 1 duplicate(s) ; g0439304.png ; $m : A ^ { \prime } \rightarrow A$ ; confidence 0.9973560859607404
  74. 1 duplicate(s) ; a13007080.png ; $\sigma ( n ) > \sigma ( m )$ ; confidence 0.995848659246317
  75. 1 duplicate(s) ; e11007046.png ; $C x ^ { - 1 }$ ; confidence 0.8338278081003673
  76. 1 duplicate(s) ; p07416038.png ; $\mu _ { 1 } = \mu _ { 2 } = \mu > 0$ ; confidence 0.9998340722154501
  77. 1 duplicate(s) ; f040230157.png ; $\Delta ^ { n } f ( x )$ ; confidence 0.9761551779890966
  78. 1 duplicate(s) ; m0653306.png ; $P \{ X _ { 1 } = n _ { 1 } , \dots , X _ { k } = n _ { k } \} = \frac { n ! } { n ! \cdots n _ { k } ! } p _ { 1 } ^ { n _ { 1 } } \dots p _ { k } ^ { n _ { k } }$ ; confidence 0.054218093847858334
  79. 1 duplicate(s) ; t09466044.png ; $t \in [ - 1,1 ]$ ; confidence 0.9658081901466191
  80. 1 duplicate(s) ; m063240457.png ; $\mu _ { i } ( X _ { i } ) = 1$ ; confidence 0.9902724405115619
  81. 1 duplicate(s) ; c020800a.gif ; Missing ; confidence 0
  82. 1 duplicate(s) ; a13004089.png ; $D$ ; confidence 0.9836142568793015
  83. 1 duplicate(s) ; m0645406.png ; $m _ { G } = D ( u ) / 2 \pi$ ; confidence 0.8112748700162913
  84. 1 duplicate(s) ; c022780328.png ; $im ( \Omega _ { S C } \rightarrow \Omega _ { O } )$ ; confidence 0.23040392825448733
  85. 1 duplicate(s) ; c120210117.png ; $\Lambda _ { n } ( \theta ) - h ^ { \prime } \Delta _ { n } ( \theta ) \rightarrow - \frac { 1 } { 2 } h ^ { \prime } \Gamma ( \theta ) h$ ; confidence 0.8428428443145696
  86. 1 duplicate(s) ; c024850182.png ; $m = p _ { 1 } ^ { \alpha _ { 1 } } \ldots p _ { s } ^ { \alpha _ { S } }$ ; confidence 0.46249649812198196
  87. 1 duplicate(s) ; a11040023.png ; $T ^ { * }$ ; confidence 0.9844626718823335
  88. 1 duplicate(s) ; c02203033.png ; $C _ { \omega }$ ; confidence 0.07294451014735373
  89. 1 duplicate(s) ; b110100421.png ; $S : \Omega \rightarrow L ( Y , X )$ ; confidence 0.9939321146895647
  90. 1 duplicate(s) ; b12031032.png ; $0 \leq \delta \leq ( n - 1 ) / 2 ( n + 1 )$ ; confidence 0.9985895509258916
  91. 1 duplicate(s) ; c02147033.png ; $\tilde { Y } \square _ { j } ^ { ( k ) } \in Y _ { j }$ ; confidence 0.17197034114794676
  92. 1 duplicate(s) ; w12005029.png ; $D = R [ x ] / D$ ; confidence 0.9679769594271714
  93. 1 duplicate(s) ; g0432908.png ; $\alpha _ { k } = \frac { \Gamma ( \gamma + k + 1 ) } { \Gamma ( \gamma + 1 ) } \sqrt { \frac { \Gamma ( \alpha _ { 1 } + 1 ) \Gamma ( \alpha _ { 2 } + 1 ) } { \Gamma ( \alpha _ { 1 } + k + 1 ) \Gamma ( \alpha _ { 2 } + k + 1 ) } }$ ; confidence 0.9041210547693775
  94. 1 duplicate(s) ; s087420100.png ; $( 1 , \dots , k )$ ; confidence 0.7759125219520806
  95. 1 duplicate(s) ; b12009047.png ; Missing ; confidence 0
  96. 1 duplicate(s) ; h04756028.png ; $f ^ { - 1 } \circ f ( z ) = z$ ; confidence 0.9863835099245214
  97. 1 duplicate(s) ; c027480106.png ; $\Sigma _ { S }$ ; confidence 0.7602855286138045
  98. 1 duplicate(s) ; b01667071.png ; $n _ { 1 } = 9$ ; confidence 0.8217276068104418
  99. 1 duplicate(s) ; l05798044.png ; $H ^ { p , q } ( X )$ ; confidence 0.9128683228703054
  100. 1 duplicate(s) ; f04069072.png ; $\alpha _ { \alpha } ^ { * } ( f ) \Omega = f$ ; confidence 0.9617933295666078
  101. 1 duplicate(s) ; e12018018.png ; $\operatorname { sign } ( M ) = \int _ { M } L ( M , g ) - \eta _ { D } ( 0 )$ ; confidence 0.9583030996297096
  102. 1 duplicate(s) ; z13002034.png ; $F , F _ { \tau } \subset P$ ; confidence 0.9767753813241717
  103. 1 duplicate(s) ; c02242019.png ; $\phi ( x ) = ( 1 - x ) ^ { \alpha } ( 1 + x ) ^ { \beta }$ ; confidence 0.9976319244241609
  104. 1 duplicate(s) ; m13019018.png ; $M _ { n } = [ m _ { i } + j ] _ { i , j } ^ { n } = 0$ ; confidence 0.46928897388284957
  105. 1 duplicate(s) ; s09045015.png ; $\int [ 0 , t ] X \circ d X = ( 1 / 2 ) X ^ { 2 } ( t )$ ; confidence 0.6980818282530422
  106. 1 duplicate(s) ; w12002010.png ; $l _ { 1 } ( P , Q )$ ; confidence 0.6109194252117595
  107. 1 duplicate(s) ; i13009013.png ; $k = k _ { 0 } \subset k _ { 1 } \subset \ldots \subset k _ { n } \subset \ldots \subset K = \cup _ { n \geq 0 } k _ { k }$ ; confidence 0.43410160727313885
  108. 1 duplicate(s) ; s09013055.png ; $K . ( H X ) = ( K H ) X$ ; confidence 0.7659737865659941
  109. 1 duplicate(s) ; u09544020.png ; $U ( \epsilon )$ ; confidence 0.9981553778972309
  110. 1 duplicate(s) ; b01747069.png ; $P _ { 1 / 2 }$ ; confidence 0.9956493318117914
  111. 1 duplicate(s) ; l12006027.png ; $\phi \in H$ ; confidence 0.9809538776286444
  112. 1 duplicate(s) ; h11040046.png ; $\int _ { X } | f ( x ) | ^ { 2 } \operatorname { ln } | f ( x ) | d \mu ( x ) \leq$ ; confidence 0.9895172018375741
  113. 1 duplicate(s) ; b0169702.png ; $x ^ { \sigma } = x$ ; confidence 0.9478216561987443
  114. 1 duplicate(s) ; s0865507.png ; $B _ { N } A ( B _ { N } ( \lambda - \lambda _ { 0 } ) )$ ; confidence 0.980198148600406
  115. 1 duplicate(s) ; v096900234.png ; $\Pi I _ { \lambda }$ ; confidence 0.2996377272936826
  116. 1 duplicate(s) ; s08514031.png ; $S _ { x , m } = \operatorname { sup } _ { | x | < \infty } | F _ { n } ( x ) - F _ { m } ( x ) |$ ; confidence 0.2014066318219743
  117. 1 duplicate(s) ; i05073087.png ; $\chi _ { \pi } ( g ) = \sum _ { \{ \delta : \delta y \in H \delta \} } \chi _ { \rho } ( \delta g \delta ^ { - 1 } )$ ; confidence 0.902751217861617
  118. 1 duplicate(s) ; w120070106.png ; $C ^ { \prime } = 1$ ; confidence 0.9986067312742835
  119. 1 duplicate(s) ; n06684027.png ; $X = N ( A ) + X , \quad Y = Z + R ( A )$ ; confidence 0.9876165622757166
  120. 1 duplicate(s) ; r081470221.png ; $\oplus R ( S _ { n } )$ ; confidence 0.9053981209446474
  121. 1 duplicate(s) ; d13009024.png ; $1 \leq u \leq 2$ ; confidence 0.97632096204764
  122. 1 duplicate(s) ; s09108054.png ; $\sum _ { n < x } f ( n ) = R ( x ) + O ( x ^ { \{ ( \alpha + 1 ) ( 2 \eta - 1 ) / ( 2 \eta + 1 ) \} + \epsilon } )$ ; confidence 0.7947232878891592
  123. 1 duplicate(s) ; r08061050.png ; $E ( Y - f ( x ) ) ^ { 2 }$ ; confidence 0.5470389324901368
  124. 1 duplicate(s) ; b11088033.png ; $P _ { I } ^ { f } : C ^ { \infty } \rightarrow L$ ; confidence 0.32143585152427034
  125. 1 duplicate(s) ; a13007033.png ; $< 1$ ; confidence 0.9989134216768655
How to Cite This Entry:
Maximilian Janisch/latexlist/latex. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Maximilian_Janisch/latexlist/latex&oldid=43757