Clarkson's type inequalities for positive $l_p$ sequences with $p\ge 2$

Details Clarkson's type inequalities for positive $l_p$ sequences with $p\ge 2$ Clarkson's type inequalities for positive $l_p$ sequences with $p\ge 2$

2011-09-23

arxiv.org/abs/1109.5152v1

Mathematics

Number Theory

6 pages

Scientific paper

For a fixed $1\le p<+\infty$ denote by $\Vert\cdot\Vert_p$ the usual norm in the space $l_p$ (or $L_p$). In this paper we prove that for all real numbers $p$ and $q$ such that $2\le p\le q$ holds $$ 2(\Vert x\Vert_p^q+\Vert y\Vert_p^q)\le \Vert x+y\Vert_p^q +\Vert x-y\Vert_p^q $$ for all nonnegative sequences $x=\{x_n\},y=\{y_n\}$ in $l_p$ (or nonnegative functions $x,y$ in $L_p$). Note that the above inequality with $p=q\ge 2$ reduces to the well known Clarkson's inequality. If in addition, holds $x_i\ge y_i$ for each $i=1,2,...$ (or $x\ge y$ a.e. in $L_p$), then we establish an improvement of the above inequality.

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