\(S(M,g)\)-pseudo-differential calculus with spectral invariance on \(\mathbb R^n\) and manifolds for Banach function spaces (Q2715871)

In this thesis Hörmander's \(S(M,g)\)-calculus on \(\mathbb{R}^n\) is extended to noncompact manifolds equipped with a special class of admissible coordinate charts, generalizing the concept of \(SG\)-compatible manifolds. The operators act on a globally defined scale of Sobolev spaces and also on Orlicz-Sobolev spaces. The operators belonging to the corresponding algebra of pseudodifferential operators are characterized in terms of iterated commutators. This is used to obtain \(C^\infty\) calculus, based on Weyl's formula, for several selfadjoint (not necessarily commuting) \(L^2(\mathbb{R}^n)\) bounded pseudodifferential operators in \(\Psi(1, g)\). NEWLINENEWLINENEWLINEAlso, these results are used to prove the spectral invariance of the algebra of zero order operators in \(\Psi(1, g)\). A sufficient condition is given under which a pseudodifferential operator extends to a generator of a Feller semigroup. NEWLINENEWLINENEWLINEThe calculus developed in this work is very general, for example it allows to ``piece together'' various different \((\rho, \delta)\) calculii.