The Witten deformation of the Dolbeault complex

Abstract

We introduce a Witten-Novikov type perturbation ∂ω of the Dolbeault complex of any complex K\"ahler manifold, defined by a form ω of type (1,0) with ∂ω=0. We give an explicit description of the associated index density which shows that it exhibits a nontrivial dependence on ω. The heat invariants of lower order are shown to be zero.