Peetre's inequality: Difference between revisions

Latest revision as of 09:04, 30 January 2023

In mathematics, Peetre's inequality, named after Jaak Peetre, says that for any real number $t$ and any vectors $x$ and $y$ in $ℝ^{n},$ the following inequality holds: ${(\frac{1 + | x |^{2}}{1 + | y |^{2}})}^{t} \leq 2^{| t |} (1 + | x - y |^{2})^{| t |} .$

The inequality was proved by J. Peetre in 1959 and has founds applications in functional analysis and Sobolev spaces.

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Planetmath.org: Peetre's inequality

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Peetre's inequality: Difference between revisions

Latest revision as of 09:04, 30 January 2023

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Peetre's inequality: Difference between revisions

Latest revision as of 09:04, 30 January 2023

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