L2-type invariants for complex smooth quasi-projective varieties -- a survey

Abstract

Let X be a complex smooth quasi-projective variety with an epimorphism π1(X) Zn. We survey recent developments about the asymptotic behaviour of Betti numbers with any field coefficients and the order of the torsion part of singular integral homology of finite abelian covers of X associated to , known as the L2-type invariants. We give relations between L2-type invariants, Alexander invariants and cohomology jump loci. When is orbifold effective, we give explicit formulas for L2-invariants at homological degree one in terms of geometric information of X. We also propose several related open questions for hyperplane arrangement complement.