Commuting graphs on Coxeter groups, Dynkin diagrams and finite subgroups of SL(2,C)

Abstract

For a group H and a non empty subset ⊂eq H, the commuting graph G=C(H,) is the graph with as the node set and where any x,y ∈ are joined by an edge if x and y commute in H. We prove that any simple graph can be obtained as a commuting graph of a Coxeter group, solving the realizability problem in this setup. In particular we can recover every Dynkin diagram of ADE type as a commuting graph. Thanks to the relation between the ADE classification and finite subgroups of (2,), we are able to rephrase results from the McKay correspondence in terms of generators of the corresponding Coxeter groups. We finish the paper studying commuting graphs C(H,) for every finite subgroup H⊂(2,) for different subsets ⊂eq H, and investigating metric properties of them when =H.