Twisted cohomology of arrangements of lines and Milnor fibers

TL;DR

This paper explores the twisted cohomology of line arrangements in complex plane and proposes a conjecture relating the first homology of Milnor fibers to the combinatorics of the arrangement, providing partial proofs and new descriptions.

Contribution

It introduces a new vanishing conjecture linking the combinatorics of line arrangements to the monodromy action on Milnor fiber homology, with partial proofs and a novel group-theoretic approach.

Findings

Conjecture holds when the graph of double points is connected.

New group-theoretic description of the fundamental group related to Milnor fibers.

Partial proofs of the conjecture under additional hypotheses.

Abstract

Let $\A$ be an arrangement of affine lines in $\C^2,$ with complement $\M(\A).$ The (co)homo-logy of $\M(\A)$ with twisted coefficients is strictly related to the cohomology of the Milnor fibre associated to the conified arrangement, endowed with the geometric monodromy. Although several partial results are known, even the first Betti number of the Milnor fiber is not understood. We give here a vanishing conjecture for the first homology, which is of a different nature with respect to the known results. Let $\Gamma$ be the graph of \emph{double points} of $\A:$ we conjecture that if $\Gamma$ is connected then the geometric monodromy acts trivially on the first homology of the Milnor fiber (so the first Betti number is combinatorially determined in this case). This conjecture depends only on the combinatorics of $\A.$ We prove it in some cases with stronger hypotheses. In the final parts, we introduce a new description in terms of the group given by the quotient ot the commutator subgroup of $\pi_1(\M(\A))$ by the commutator of its \emph{length zero subgroup.} We use that to deduce some new interesting cases of a-monodromicity, including a proof of the conjecture under some extra conditions.