Symbolic calculus and M-ellipticity of pseudo-differential operators on Zn

Abstract

In this paper, we introduce and study a class of pseudo-differential operators on the lattice Zn. More preciously, we consider a weighted symbol class M, m( Zn× Tn), m∈ R associated to a suitable weight function on Z n. We study elements of the symbolic calculus for pseudo-differential operators associated with M, m( Zn× Tn) by deriving formulae for the composition, adjoint, transpose. We define the notion of M-ellipticity for symbols belonging to M, m( Zn× Tn) and 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 on 2(Zn) subject to the M-ellipticity of symbols. We also determine the domains of the minimal and maximal operators. Finally, We discuss Fredholmness and compute the index of M-elliptic pseudo-differential operators on Zn.