L2 and intersection cohomologies for the reductive representation of the fundamental groups of quasiprojective manifolds with unipotent local monodromy

Abstract

Let X be a projective manifold, and D be a normal crossing divisor of X. By Jost-Zuo's theorem that if we have a reductive representation of the fundamental group π1(X*) with unipotent local monodromy, where X*=X-D, then there exists a tame pluriharmonic metric h on the flat bundle V associated to the local system V obtain from over X*. Therefore, we get a harmonic bundle (E, θ, h), where θ is the Higgs field, i.e. a holomorphic section of End(E)1,0X* satisfying θ2=0. In this paper, we study the harmonic bundle (E,θ,h) over X*. We are going to prove that the intersection cohomology IHk(X; V) is isomorphic to the L2-cohomology Hk(X, ( A(2)·(X, V), D)).