On local Liakopoulos-Meyer type inequalities and their functional counterparts

Abstract

We provide a functional Rogers-Shephard type inequality for log-concave functions on Rn and any 1-reducible s-cover of [n]. As a consequence, we derive a sharp local Liakopoulos-Meyer type inequality for n-dimensional convex bodies and 1-reducible s-covers of any σ⊂[n], solving a question studied by Brazitikos, Giannopoulos, Liakopoulos in [14] as well as Alonso-Guti\'errez, Bernu\'es, Brazitikos, Carbery in [3].

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