Supersolvability and Freeness for -graphical Arrangements

Abstract

Let G be a simple graph on the vertex set \v1,…,vn\ with edge set E. Let K be a field. The graphical arrangement AG in Kn is the arrangement xi-xj=0, vivj ∈ E. An arrangement A is supersolvable if the intersection lattice L(c(A)) of the cone c(A) contains a maximal chain of modular elements. The second author has shown that a graphical arrangement AG is supersolvable if and only if G is a chordal graph. He later considered a generalization of graphical arrangements which are called -graphical arrangements. He conjectured a characterization of the supersolvability and freeness (in the sense of Terao) of a -graphical arrangement. We provide a proof of the first conjecture and state some conditions on free -graphical arrangements.