Regular functional covering numbers

Abstract

We establish the existence of a regular functional M-position, in the sense of Pisier, for geometric log-concave functions. This provides a functional analogue of Pisier's regular M-positions for convex bodies and yields uniform control of covering numbers at all scales. Specifically, we show that every isotropic geometric log-concave function f:Rn [0,∞) satisfies, for all t≥ 1, \N(f, t · g),\,N(f*, t · g),\,N(g, t · f),\,N(g, t · f*)\ ≤ ( γn2\, nt ), where f* denotes the Legendre dual of f, (t · f)(x)=f(x/t) is the t-homothety of f, g(x)= (-12|x|2) and γn ≤ c( n)2. Our result shows that the isotropic position of a log-concave function already provides an almost 1-regular functional M-position.

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