Integral homology groups of double coverings and rank one Z-local system for minimal CW complex

Abstract

Let X be a connected finite CW complex. A connected double covering of X is classified by a non-zero cohomology class ω ∈ H1(X,Z2). Denote the double covering space by Xω. There exists a corresponding non-trivial rank one Z-local system Lω on X. What is the relation between the integral homology groups of Xω and the homology groups of the local system Lω? When X is homotopy equivalent to a minimal CW complex, we give a complete answer to this question. In particular, this settles a conjecture recently proposed by Ishibashi, Sugawara and Yoshinaga for hyperplane arrangement complement. As an application, when X is a hyperplane arrangement complement and Lω satisfies certain conditions, we show that H*(Xω,Z) is combinatorially determined.