Difference between revisions of "Bunyakovskii inequality"
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− | An equality in mathematical analysis, established by V.Ya. Bunyakovskii [[#References|[1]]] for square-integrable functions | + | An equality in mathematical analysis, established by V.Ya. Bunyakovskii [[#References|[1]]] for square-integrable functions $ f $ and $ g $ : |
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+ | \left[ \int_{a}^{b}f(x)g(x)\,dx\right]^2 \le \int_{a}^{b}f^2(x)\,dx \int_{a}^{b}g^2(x)\,dx. | ||
+ | \] | ||
This inequality is analogous to Cauchy's algebraic inequality | This inequality is analogous to Cauchy's algebraic inequality | ||
− | + | \[ | |
− | + | (a_1 b_1 + \dots + a_n b_n)^2 \le (a_1^2 + \dots + a_n^2)(b_1^2 + \dots + b_n^2). | |
− | + | \] | |
The Bunyakovskii inequality is also known as the Schwarz inequality; however, Bunyakovskii published his study as early as 1859, whereas in H.A. Schwarz' work this inequality appeared as late as 1884 (without any reference to the work of Bunyakovskii). | The Bunyakovskii inequality is also known as the Schwarz inequality; however, Bunyakovskii published his study as early as 1859, whereas in H.A. Schwarz' work this inequality appeared as late as 1884 (without any reference to the work of Bunyakovskii). | ||
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====References==== | ====References==== | ||
<table><TR><TD valign="top">[1]</TD> <TD valign="top"> W. [V.Ya. Bunyakovskii] Bounjakowsky, "Sur quelques inegalités concernant les intégrales aux différences finis" ''Mem. Acad. Sci. St. Petersbourg (7)'' , '''1''' (1859) pp. 9</TD></TR></table> | <table><TR><TD valign="top">[1]</TD> <TD valign="top"> W. [V.Ya. Bunyakovskii] Bounjakowsky, "Sur quelques inegalités concernant les intégrales aux différences finis" ''Mem. Acad. Sci. St. Petersbourg (7)'' , '''1''' (1859) pp. 9</TD></TR></table> | ||
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====Comments==== | ====Comments==== | ||
− | In Western literature this inequality is often called the Cauchy inequality, or the Cauchy–Schwarz inequality. Its generalization to a function | + | In Western literature this inequality is often called the Cauchy inequality, or the Cauchy–Schwarz inequality. Its generalization to a function $ f $ in $ L_p $ and a function $ g $ in $ L_q $, $ 1/p + 1/q = 1 $, is called the [[Hölder inequality|Hölder inequality]]. |
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− | + | Cauchy's algebraic inequality stated above holds for real numbers $ a_i, b_i, \quad i = 1, \dots, n $. For complex numbers $ a_i, b_i, \quad i = 1, \dots, n$, it reads | |
− | + | \[ | |
+ | \left| a_1 \overline{b_1} + \dots + a_n \overline{b_n}\right|^2 \le (|a_1^2| + \dots + |a_n^2|) \cdot (|b_1^2| + \dots + |b_n^2|). | ||
+ | \] | ||
It has a generalization analogous to the Hölder inequality. | It has a generalization analogous to the Hölder inequality. |
Revision as of 08:22, 31 May 2013
An equality in mathematical analysis, established by V.Ya. Bunyakovskii [1] for square-integrable functions $ f $ and $ g $ :
\[ \left[ \int_{a}^{b}f(x)g(x)\,dx\right]^2 \le \int_{a}^{b}f^2(x)\,dx \int_{a}^{b}g^2(x)\,dx. \]
This inequality is analogous to Cauchy's algebraic inequality
\[ (a_1 b_1 + \dots + a_n b_n)^2 \le (a_1^2 + \dots + a_n^2)(b_1^2 + \dots + b_n^2). \]
The Bunyakovskii inequality is also known as the Schwarz inequality; however, Bunyakovskii published his study as early as 1859, whereas in H.A. Schwarz' work this inequality appeared as late as 1884 (without any reference to the work of Bunyakovskii).
References
[1] | W. [V.Ya. Bunyakovskii] Bounjakowsky, "Sur quelques inegalités concernant les intégrales aux différences finis" Mem. Acad. Sci. St. Petersbourg (7) , 1 (1859) pp. 9 |
Comments
In Western literature this inequality is often called the Cauchy inequality, or the Cauchy–Schwarz inequality. Its generalization to a function $ f $ in $ L_p $ and a function $ g $ in $ L_q $, $ 1/p + 1/q = 1 $, is called the Hölder inequality.
Cauchy's algebraic inequality stated above holds for real numbers $ a_i, b_i, \quad i = 1, \dots, n $. For complex numbers $ a_i, b_i, \quad i = 1, \dots, n$, it reads
\[ \left| a_1 \overline{b_1} + \dots + a_n \overline{b_n}\right|^2 \le (|a_1^2| + \dots + |a_n^2|) \cdot (|b_1^2| + \dots + |b_n^2|). \]
It has a generalization analogous to the Hölder inequality.
References
[a1] | W. Rudin, "Principles of mathematical analysis" , McGraw-Hill (1953) |
Bunyakovskii inequality. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Bunyakovskii_inequality&oldid=29798