Characteristic varieties for a class of line arrangements

Abstract

Let A be a line arrangement in the complex projective plane P2, having the points of multiplicity ≥ 3 situated on two lines in A, say H0 and H∞. Then we show that the non-local irreducible components of the first resonance variety R1(A) are 2-dimensional and correspond to parallelograms P in C2=P2 H∞ whose sides are in A and for which H0 is a diagonal.