Spectral multipliers on two-step stratified Lie groups with degenerate group structure

Abstract

Let L be a sub-Laplacian on a two-step stratified Lie group G of topological dimension d. We prove new Lp-spectral multiplier estimates under the sharp regularity condition s>d|1/p-1/2| in settings where the group structure of G is degenerate, extending previously known results for the non-degenerate case. Our results include variants of the free two-step nilpotent group on three generators and Heisenberg-Reiter groups. The proof combines restriction type estimates with a detailed analysis of the sub-Riemannian geometry of G. A key novelty of our approach is the use of a refined spectral decomposition into caps on the unit sphere in the center of the Lie group.