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The variance conjecture on projections of the cube
Published 29 Mar 2017 in math.FA | (1703.09973v1)
Abstract: We prove that the uniform probability measure $\mu$ on every $(n-k)$-dimensional projection of the $n$-dimensional unit cube verifies the variance conjecture with an absolute constant $C$ $$\textrm{Var}\mu|x|2\leq C \sup{\theta\in S{n-1}}{\mathbb E}\mu\langle x,\theta\rangle2{\mathbb E}\mu|x|2, $$ provided that $1\leq k\leq\sqrt n$. We also prove that if $1\leq k\leq n{\frac{2}{3}}(\log n){-\frac{1}{3}}$, the conjecture is true for the family of uniform probabilities on its projections on random $(n-k)$-dimensional subspaces.
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