The functional form of Mahler conjecture for even log-concave functions in dimension 2
Abstract
Let : R n → R +∞ be an even convex function and L be its Legendre transform. We prove the functional form of Mahler conjecture concerning the functional volume product P () = e -- e --L in dimension 2: we give the sharp lower bound of this quantity and characterize the equality case. The proof uses the computation of the derivative in t of P (t) and ideas due to Meyer [M] for unconditional convex bodies, adapted to the functional case by Fradelizi-Meyer [FM2] and extended for symmetric convex bodies in dimension 3 by Iriyeh-Shibata [IS] (see also [FHMRZ]).
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