On the essential spectrum of elliptic differential operators

Abstract

Let A be a C*-algebra of bounded uniformly continuous functions on X=Rd such that A is stable under translations and contains the continuous functions that have a limit at infinity. Denote A the boundary of X in the character space of A. Then the crossed product A=A X of A by the natural action of X on A is a well defined C*-algebra and to each operator A∈A one may naturally associate a family of bounded operators A on L2(X) indexed by the characters ∈A. We show that the essential spectrum of A is the union of the spectra of the operators A. The applications cover very general classes of singular elliptic operators.