Independence and matching numbers of some token graphs

Abstract

Let G be a graph of order n and let k∈\1,…,n-1\. The k-token graph Fk(G) of G, is the graph whose vertices are the k-subsets of V(G), where two vertices are adjacent in Fk(G) whenever their symmetric difference is an edge of G. We study the independence and matching numbers of Fk(G). We present a tight lower bound for the matching number of Fk(G) for the case in which G has either a perfect matching or an almost perfect matching. Also, we estimate the independence number for bipartite k-token graphs, and determine the exact value for some graphs.