Weighted periodic and discrete Pseudo-Differential Operators

Abstract

In this paper, we study elements of symbolic calculus for pseudo-differential operators associated with the weighted symbol class M, m( T× Z) (associated to a suitable weight function on Z) by deriving formulae for the asymptotic sums, composition, adjoint, transpose. We also construct the parametrix of M-elliptic pseudo-differential operators on T. Further, we prove a version of Gohberg's lemma for pseudo-differetial operators with weighted symbol class M, 0( T× Z) and as an application, we provide a sufficient and necessary condition to ensure that the corresponding pseudo-differential operator is compact on L2(T). Finally, we provide Garding's and Sharp Garding's inequality for M-elliptic operators on Z and T, respectively, and present an application in the context of strong solution of the pseudo-differential equation Tσ u=f in L2(T).