On Betti Numbers of Milnor Fiber of Hyperplane Arrangements

Abstract

Let A be a central hyperplane arrangement in Cn+1 and Hi,i=1,2,...,d be the defining equations of the hyperplanes of A. Let f=Πi Hi. There is a global Milnor fibration F Cn+1 A f C*, where F is called the Milnor fiber and can be identified as the affine hypersurface f=1 in Cn+1. Many open questions have been raised subject to F. In particular, it has been conjectured that the integral homology, or the characteristic polynomial, hence the Betti numbers, of F are also determined by the intersection lattice L(A). In this paper, we find a combinatorial upper bound for the first the characteristic polynomial of the Milnor fiber for central hyperplane arrangements, which improves existing results in the study. As a corollary, we obtain a combinatorial obstruction for trivial algebraic monodromy of the first homology of Milnor fiber. Calculations and comparisons to known examples computed using Fox calculus will be provided.