Compact convergence, deformation of the L2-∂-complex and canonical K-homology classes

Abstract

Let (X,γ) be a compact, irreducible Hermitian complex space of complex dimension m and with dim(sing(X))=0. Let (F,τ)→ X be a Hermitian holomorphic vector bundle over X and let us denote with F,m,abs the rolled-up operator of the maximal L2-∂ complex of F-valued (m,)-forms. Let π:M→ X be a resolution of singularities, g a metric on M, E:=π*F and :=π*τ. In this paper, under quite general assumptions on τ, we prove the following equality of analytic K-homology classes [F,m,abs]=π*[E,m], with E,m the rolled-up operator of the L2-∂ complex of E-valued (m,)-forms on M. Our proof is based on functional analytic techniques developed in KuSh and provides an explicit homotopy between the even unbounded Fredholm modules induced by F,m,abs and E,m.