Vertex-weighted graphs and freeness of -graphical arrangements

Abstract

Let G be a simple graph of vertices \1, …, \ with edge set EG . The graphical arrangement AG consists of hyperplanes \xi-xj=0\ , where \i, j \ ∈ EG . It is well known that three properties, chordality of G , supersolvability of AG , and freeness of AG are equivalent. Recently, Richard P. Stanley introduced -graphical arrangement AG, as a generalization of graphical arrangements. Lili Mu and Stanley characterized the supersolvability of the -graphical arrangements and conjectured that the freeness and the supersolvability of -graphical arrangements are equivalent. In this paper, we will prove the conjecture.