Colouring signed analogues of Kneser, Schrijver, and Borsuk graphs
Abstract
The Kneser signed graph (n,k), k≤ n, is the graph whose vertices are signed k-subsets of [n] (i.e. k-subsets S of \ 1, 2, …, n\ such that S (-S)=). Two vertices A and B are adjacent with a positive edge if A (-B)= and with a negative edge if A B=. We prove that the balanced chromatic number of (n,k) is n-k+1. We then introduce the signed analogue of Schrijver graphs and show that they form vertex-critical subgraphs of (n,k) with respect to balanced colouring. Further connection to topological methods, in particular, connection to Borsuk signed graphs is also considered.
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