An inequality for the convolutions on unimodular locally compact groups and the optimal constant of Young's inequality

Abstract

Let μ be the Haar measure of a unimodular locally compact group G and m (G) as the infimum of the volumes of all open subgroups of G. The main result of this paper is that align* ∫G f ( φ1 * φ2 ) ( g ) dg ≤ ∫R f ( φ1* * φ2* ) ( x ) dx align* holds for any measurable functions φ1, φ2 G R≥ 0 with μ ( supp \; φ1 ) + μ ( supp \; φ2 ) ≤ m(G) and any convex function f R≥ 0 R with f(0) = 0. Here φ* is the rearrangement of φ. Let YO(P,G) and YR(P,G) denote the optimal constants of Young's and the reverse Young's inequality, respectively, under the assumption μ ( supp \; φ1 ) + μ ( supp \; φ2 ) ≤ m(G). Then we have YO(P,G) ≤ YO(P,R) and YR(P,G) ≥ YR(P,R) as a corollary. Thus, we obtain that m (G) = ∞ if and only if H (p,G) ≤ H (p, R) in the case of p' := p/(p-1) ∈ 2 Z, where H (p,G) is the optimal constant of the Hausdorff--Young inequality.