Littlewood's 4/3 inequality: Difference between revisions

In mathematical analysis, Littlewood's 4/3 inequality, named after John Edensor Littlewood,^[1] is an inequality that holds for every complex-valued bilinear form defined on ${\displaystyle c_0}$, the Banach space of scalar sequences that converge to zero.

Precisely, let ${\displaystyle B:c_0\times c_0\to ℂ}$ or ${\displaystyle ℝ}$ be a bilinear form. Then the following holds:

${\displaystyle {({\displaystyle \sum _{i,j=1}^{\mathrm{\infty }}}|B(e_i,e_j){|}^{4/3})}^{3/4}\le \sqrt{2}\Vert B\Vert ,}$

where

${\displaystyle \Vert B\Vert =\sup \{|B(x_1,x_2)|:\Vert x_i{\Vert }_{\mathrm{\infty }}\le 1\}.}$

The exponent 4/3 is optimal, i.e., cannot be improved by a smaller exponent.^[2] It is also known that for real scalars the aforementioned constant is sharp.^[3]

Bohnenblust–Hille inequality^[4] is a multilinear extension of Littlewood's inequality that states that for all ${\displaystyle m}$-linear mapping ${\displaystyle M:c_0\times \cdots \times c_0\to ℂ}$ the following holds:

${\displaystyle {({\displaystyle \sum _{i_1,\dots ,i_m=1}^{\mathrm{\infty }}}|M(e_{i_1},\dots ,e_{i_m}){|}^{2m/(m+1)})}^{(m+1)/(2m)}\le 2^{(m-1)/2}\Vert M\Vert ,}$

• Grothendieck inequality

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