Difference between revisions of "Chebyshev inequality"
From Encyclopedia of Mathematics
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''for finite monotone sequences | ''for finite monotone sequences | ||
− | + | $$a_1\leq\ldots\leq a_n,\quad b_1\leq\ldots\leq b_n$$ | |
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The inequality | The inequality | ||
− | + | $$\sum_{k=1}^na_k\sum_{k=1}^nb_k\leq n\sum_{k=1}^na_kb_k.$$ | |
− | Chebyshev's inequality for monotone functions | + | Chebyshev's inequality for monotone functions $f,g\geq0$ is the inequality |
− | + | $$\int\limits_a^bf(x)dx\int\limits_a^bg(x)dx\leq(b-a)\int\limits_a^bf(x)g(x)dx,$$ | |
− | where | + | where $f$ and $g$ are either both increasing or both decreasing on $[a,b]$. |
The inequalities were established by P.L. Chebyshev in 1882. | The inequalities were established by P.L. Chebyshev in 1882. | ||
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====Comments==== | ====Comments==== | ||
− | It is not important that | + | It is not important that $f$ and $g$ be non-negative. The proof consists of simply integrating the non-negative function $\tau(x,y)=[f(x)-f(y)][g(x)-g(y)]$ over the square $[a,b]\times[a,b]$. |
Revision as of 15:40, 4 November 2014
for finite monotone sequences
$$a_1\leq\ldots\leq a_n,\quad b_1\leq\ldots\leq b_n$$
The inequality
$$\sum_{k=1}^na_k\sum_{k=1}^nb_k\leq n\sum_{k=1}^na_kb_k.$$
Chebyshev's inequality for monotone functions $f,g\geq0$ is the inequality
$$\int\limits_a^bf(x)dx\int\limits_a^bg(x)dx\leq(b-a)\int\limits_a^bf(x)g(x)dx,$$
where $f$ and $g$ are either both increasing or both decreasing on $[a,b]$.
The inequalities were established by P.L. Chebyshev in 1882.
Comments
It is not important that $f$ and $g$ be non-negative. The proof consists of simply integrating the non-negative function $\tau(x,y)=[f(x)-f(y)][g(x)-g(y)]$ over the square $[a,b]\times[a,b]$.
How to Cite This Entry:
Chebyshev inequality. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Chebyshev_inequality&oldid=15534
Chebyshev inequality. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Chebyshev_inequality&oldid=15534
This article was adapted from an original article by V.I. Bityutskov (originator), which appeared in Encyclopedia of Mathematics - ISBN 1402006098. See original article