An Analytic Grothendieck Riemann Roch Theorem

Abstract

We extend the Boutet de Monvel Toeplitz index theorem to complex manifold with isolated singularities following the relative K-homology theory of Baum, Douglas, and Taylor for manifold with boundary. We apply this index theorem to study the Arveson-Douglas conjecture. Let m be the unit ball in Cm, and I an ideal in the polynomial algebra C[z1, ·s, zm]. We prove that when the zero variety ZI is a complete intersection space with only isolated singularities and intersects with the unit sphere S2m-1 transversely, the representations of C[z1, ·s, zm] on the closure of I in L2a(m) and also the corresponding quotient space QI are essentially normal. Furthermore, we prove an index theorem for Toeplitz operators on QI by showing that the representation of C[z1, ·s, zm] on the quotient space QI gives the fundamental class of the boundary ZI S2m-1. In the appendix, we prove with Kai Wang that if f∈ L2a(m) vanishes on ZI m, then f is contained inside the closure of the ideal I in L2a(m).