Homotopy type of the independence complex of some categorical products of graphs

Abstract

It was conjectured by Goyal, Shukla and Singh that the independence complex of the categorical product K2× K3× Kn has the homotopy type of a wedge of (n-1)(3n-2) spheres of dimension 3. Here we prove this conjecture by calculating the homotopy type of the independence complex of the graphs C3r× Kn and K2× Km× Kn. For Cm × Kn when m is not a multiple of 3, we calculate the homotopy type for m = 4, 5 and show that for other values it has to have the homotopy type of a wedge of spheres of at most 2 consecutive dimensions and maybe some Moore spaces.