Efficient computation of resonance varieties via Grassmannians

Abstract

Associated to the cohomology ring A of the complement X(A) of a hyperplane arrangement A in complex m-space are the resonance varieties Rk(A). The most studied of these is R1(A), which is the union of the tangent cones at the origin to the characteristic varieties of the fundamental group of X. R1(A) may be described in terms of Fitting ideals, or as the locus where a certain Ext module is supported. Both these descriptions give obvious algorithms for computation. In this note, we show that interpreting R1(A) as the locus of decomposable two-tensors in the Orlik-Solomon ideal leads to a description of R1(A) as the intersection of a Grassmannian with a linear space, determined by the quadratic generators of the Orlik-Solomon ideal. This method is much faster than previous alternatives.