Optimal embeddings into Lorentz spaces for some vector differential operators via Gagliardo's lemma

Abstract

We prove a family of Sobolev inequalities of the form u Lnn-1, 1 (Rn,V) A (D) u L1 (Rn,E) where A (D) : C∞c (Rn, V) C∞c (Rn, E) is a vector first-order homogeneous linear differential operator with constant coefficients, u is a vector field on Rn and Lnn - 1, 1 (Rn) is a Lorentz space. These new inequalities imply in particular the extension of the classical Gagliardo-Nirenberg inequality to Lorentz spaces originally due to Alvino and a sharpening of an inequality in terms of the deformation operator by Strauss (Korn-Sobolev inequality) on the Lorentz scale. The proof relies on a nonorthogonal application of the Loomis--Whitney inequality and Gagliardo's lemma.