Peetre's inequality

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

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

• List of inequalities – None

• Chazarain, J.; Piriou, A. (2011), Introduction to the Theory of Linear Partial Differential Equations, Studies in Mathematics and its Applications, Elsevier, p. 90, ISBN 9780080875354, https://books.google.com/books?id=Gh9XeWnOzagC&pg=PA90 .
• Ruzhansky, Michael; Turunen, Ville (2009), Pseudo-Differential Operators and Symmetries: Background Analysis and Advanced Topics, Pseudo-Differential Operators, Theory and Applications, 2, Springer, p. 321, ISBN 9783764385132, https://books.google.com/books?id=DDpz_MfxZrUC&pg=PA321 .
• Saint Raymond, Xavier (1991), Elementary Introduction to the Theory of Pseudodifferential Operators, Studies in Advanced Mathematics, 3, CRC Press, p. 21, ISBN 9780849371585, https://books.google.com/books?id=kD5ZCJDIg4oC&pg=PA21 .

• Planetmath.org: Peetre's inequality

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