Resonance varieties via blowups of P2 and scrolls

Abstract

Conjectures of Suciu relate the fundamental group of the complement M = Cn of a hyperplane arrangement A to the first resonance variety of H*(M,Z). We describe a connection between the first resonance variety and the Orlik-Terao algebra C(A) of the arrangement. In particular, we show that non-local components of R1(A) give rise to determinantal syzygies of C(A). As a result, Proj(C(A)) lies on a scroll, placing geometric constraints on R1(A). The key observation is that C(A) is the homogeneous coordinate ring associated to a nef but not ample divisor on the blowup of P2 at the singular points of A.