Renormalized Index Formulas for Elliptic Differential Operators on Boundary Groupoids

Abstract

We consider the index problem of certain boundary groupoids of the form G = M 0 × M 0 Rq × M 1 × M 1. Since it has been shown that for the case that q ≥ 3 is odd, K 0 (C* (G)) , and moreover the K-theoretic index coincides with the Fredholm index, we attempt in this paper to derive a numerical formula for elliptic differential operators on G. Our approach is similar to that of renormalized trace of Moroianu and Nistor Nistor;Hom2. However, we find that when q ≥ 3, the eta term vanishes, and hence the K-theoretic and Fredholm indices of elliptic (respectively fully elliptic) pseudo-differential operators on these groupoids are given only by the Atiyah-Singer term. As for the q=1 case we find that the result depends on how the singularity set M1 lies in M.