The Generalised Shift Graph

Abstract

In 1968, Erd\"os defined the Shift Graph as the graph whose vertices are the k-element subsets of [n]=\0,1,2,...,n-1\ such that A=\a1,...,ak\ and B=\b1,...,bk\ are neighbours iff a1<b1=a2<b2=a3<... <bn-1=an<bn. In the paper On the Generalised Shift Graph, Avart, Luczac and R\"odl extend this definition to include all possible arrangements of the ais and bis, known as types. In this paper, we will consider a selection of these types and study the corresponding graphs. We are interested in to what extent the graphs G(S,τ) and G(S',τ) are distinct for distinct linear orderings S,S' and for some type τ. In this paper, we will concentrate on ordinals and types of the form σa,b=11...133...322...2. We will show that if G(α,σa,b) G(β,σa,b) then α=β. We will also consider the chromatic number and the automorphism groups of these graphs in order to gain a deeper understanding of their properties.