K-Theory of Boutet de Monvel algebras with classical SG-symbols on the half space

Abstract

We compute the K-groups of the C*-algebra of bounded operators generated by the Boutet de Monvel operators with classical SG-symbols of order (0,0) and type 0 on R+n, as defined by Schrohe, Kapanadze and Schulze. In order to adapt the techniques used in Melo, Nest, Schick and Schrohe's work on the K-theory of Boutet de Monvel's algebra on compact manifolds, we regard the symbols as functions defined on the radial compactifications of R+n×Rn and Rn-1×Rn-1. This allows us to give useful descriptions of the kernel and the image of the continuous extension of the boundary principal symbol map, which defines a C*-algebra homomorphism. We are then able to compute the K-groups of the algebra using the standard K-theory six-term cyclic exact sequence associated to that homomorphism.