Characteristic varieties of arrangements

Abstract

The k-th Fitting ideal of the Alexander invariant B of an arrangement A of n complex hyperplanes defines a characteristic subvariety, Vk(A), of the complex algebraic n-torus. In the combinatorially determined case where B decomposes as a direct sum of local Alexander invariants, we obtain a complete description of Vk(A). For any arrangement A, we show that the tangent cone at the identity of this variety coincides with R1k(A), one of the cohomology support loci of the Orlik-Solomon algebra. Using work of Arapura and Libgober, we conclude that all positive-dimensional components of Vk(A) are combinatorially determined, and that R1k(A) is the union of a subspace arrangement in Cn, thereby resolving a conjecture of Falk. We use these results to study the reflection arrangements associated to monomial groups.

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