Some remarks on L1 embeddings in the subelliptic setting

Abstract

In this paper we establish an optimal Lorentz estimate for the Riesz potential in the L1 regime in the setting of a stratified group G: Let Q≥ 2 be the homogeneous dimension of G and Iα denote the Riesz potential of order α on G. Then, for every α ∈ (0,Q), there exists a constant C=C(α,Q)>0 such that align \| Iα f \|LQ/(Q-α),1(G) ≤ C\| X I1 f \|L1(G) align for distributions f such that X I1 f ∈ L1(G), where X denotes the horizontal gradient.