The Brascamp--Lieb inequality on compact Lie groups and its extinction on homogeneous Lie groups

Abstract

We study the Brascamp--Lieb inequalities on locally compact nonabelian groups and the Brascamp--Lieb constants BL(G, σ, p) associated to a Brascamp--Lieb datum: locally compact groups G and Gj, a family of homomorphisms σj: G Gj and Lebesgue indices pj. We focus on homogeneous Lie groups and compact Lie groups. For homogeneous Lie groups G, we show that the constant BL(G, σ, p) is equal to the constant BL(g, dσ, p), where g is the Lie algebra of G and dσj is the differential of σj. For Heisenberg-like groups G, we show that the only inequalities that can occur are multilinear H\"older inequalities. For compact Lie groups, we find necessary and sufficient conditions for finiteness of the constant BL(G, σ, p) in terms of σ and p and find an explicit expression for the constant, similar to those found by Bennett and Jeong in the abelian case.