A sharp centro-affine isospectral inequality of Szeg\"o--Weinberger type and the Lp-Minkowski problem

Abstract

We establish a sharp upper-bound for the first non-zero even eigenvalue (corresponding to an even eigenfunction) of the Hilbert-Brunn-Minkowski operator associated to a strongly convex C2-smooth origin-symmetric convex body K in Rn. Our isospectral inequality is centro-affine invariant, attaining equality if and only if K is a (centered) ellipsoid; this is reminiscent of the (non affine invariant) classical Szeg\"o--Weinberger isospectral inequality for the Neumann Laplacian. The new upper-bound complements the conjectural lower-bound, which has been shown to be equivalent to the log-Brunn-Minkowski inequality and is intimately related to the uniqueness question in the even log-Minkowski problem. As applications, we obtain new strong non-uniqueness results in the even Lp-Minkowski problem in the subcritical range -n < p < 0, as well as new rigidity results for the critical exponent p=-n and supercritical regime p < -n. In particular, we show that any K as above which is not an ellipsoid is a witness to non-uniqueness in the even Lp-Minkowski problem for all p ∈ (-n,pK) and some pK ∈ (-n,0), and that K can be chosen so that pK is arbitrarily close to 0.