Non-harmonic M-elliptic pseudo differential operators on manifolds

Abstract

In this article, we introduce and study M-elliptic pseudo-differential operators in the framework of non-harmonic analysis of boundary value problems on a manifold with boundary ∂ , introduced by Ruzhansky and Tokmagambetov ( Int. Math. Res. Not. IMRN, (12), 3548-3615, 2016) in terms of a model operator L. More precisely, we consider a weighted L-symbol class M, 0, m, m∈ R, associated to a suitable weight function on a countable set I and study elements of the symbolic calculus for pseudo-differential operators associated with L-symbol class M, 0, m, by deriving formulae for the composition, adjoint, and transpose. Using the notion of M-ellipticity for symbols belonging to L-symbol class M, 0, m, we construct the parametrix of M-elliptic pseudo-differential operators. Further, we investigate the minimal and maximal extensions for M-elliptic pseudo-differential operators and show that they coincide when the symbol σ∈ M, 0, m, is M-elliptic. We provide a necessary and sufficient condition to ensure that the pseudo-differential operators Tσ with symbol in the L-symbol class M, 0,0 is a compact operator in L2() or a Riesz operator in Lp(). Finally, we prove G\"arding's inequality for pseudo-differential operators associated with symbol from M, 0,0 in the setting of non-harmonic analysis.