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Hardy's inequality is an inequality in mathematics, named after G. H. Hardy. It states that if a1,a2,a3, is a sequence of non-negative real numbers which is not identically zero, then for every real number p > 1 one has

n=1(a1+a2++ann)p<(pp1)pn=1anp.

An integral version of Hardy's inequality states if f is an integrable function with non-negative values, then

0(1x0xf(t)dt)pdx(pp1)p0f(x)pdx.

Equality holds if and only if f(x) = 0 almost everywhere.

Hardy's inequality was first published and proved (at least the discrete version with a worse constant) in 1920 in a note by Hardy.[1] The original formulation was in an integral form slightly different from the above.

See also

Notes

References

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External links

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