Global pseudo-differential operators on the Lie group G= (-1,1)n

Abstract

In this work we characterise the H\"ormander classes mδ,H\"or on the open manifold = (-1,1)n. We show that by endowing the open manifold = (-1,1)n with a group structure, the corresponding global Fourier analysis on the group allows one to define a global notion of symbol on the phase space × n. Then, the class of pseudo-differential operators associated to the global H\"ormander classes mδ × n recovers the H\"ormander classes mδ,loc defined by local coordinate systems. The analytic and qualitative properties of the classes mδ × n are presented in terms of the corresponding global symbols. In particular, Lp-Fefferman type estimates and Calder\'on-Vaillancourt theorems are analysed, as well as the spectral properties of the operators.