L2-representation of Hodge Modules

Abstract

Over an arbitrary compact complex space or an arbitrary germ of complex space X, we provide fine resolutions of pure Hodge modules with strict supports ICX(V) via differential forms with locally L2 boundary conditions. When V=CX reg is the trivial variation of Hodge structure, we give a solution to a Cheeger-Goresky-MacPherson type conjecture: For any compact complex space X, there is a complete hermitian metric ds2 on X reg such that there is a canonical isomorphism Hi(2)(X reg,ds2) IHi(X), ∀ i. Such metric ds2 could be K\"ahler if X is a K\"ahler space. As an application, we give a differential geometrical proof of the K\"ahler package of the hypercohomology of pure Hodge modules. We also prove the K\"ahler version of Kashiwara's conjecture in the absolute case.