Weighted sub-Laplacians on M\'etivier Groups: Essential Self-Adjointness and Spectrum

Abstract

Let G be a M\'etivier group and let N be any homogeneous norm on G. For α>0 denote by wα the function e-Nα and consider the weighted sub-Laplacian Lwα associated with the Dirichlet form φ ∫G |∇Hφ(y)|2 wα(y)\, dy, where ∇H is the horizontal gradient on G. Consider Lwα with domain Cc∞. We prove that Lwα is essentially self-adjoint when α ≥ 1. For a particular N, which is the norm appearing in L's fundamental solution when G is an H-type group, we prove that Lwα has purely discrete spectrum if and only if α>2, thus proving a conjecture of J. Inglis.