Topological computation of the first Milnor fiber cohomology of hyperplane arrangements

Abstract

We study a topological method to calculate the first Milnor fiber cohomology of a defining polynomial of a reduced projective hyperplane arrangement X of degree d. We can show the vanishing of a monodromy eigenspace of the first Milnor fiber cohomology with eigenvalue of order m 2 if X(X[(m)] X 3) or more generally X(X[(m)] X 3 Xd) is connected. Here X[(m)] is the set of points of X with multiplicity divisible by m, and X 3:=i,j,kXi Xj Xk with Xi the irreducible components of X, where the union is taken over i,j,k with codim\,Xi Xj Xk=3. This hypothesis can be relaxed to some extent. The assertion is reduced to the case of a line arrangement in P2 by Artin's vanishing theorem (where X 3=), and we use a projection from P2 to P1 with center a sufficiently general point of Xd. It may be expected that the assumption of an improved assertion is always satisfied for m 5 (and also for m=4 except the Hessian arrangement). The resulting vanishing of eigenspaces has been conjectured for m 5.