Deformations of box complexes

Abstract

Box complex is a Z2-space associated to a graph, and it is known that a certain Z2-homotopy invariant of it, called the Z2-index, gives an effective lower bound for the chromatic number. On the other hand, we show that any Z2-homotopy invariant of the box complex is not equivalent to the chromatic number. Namely, we construct a graph homomorphism f:X → Y such that it gives rise to a Z2-homotopy equivalence between their box complexes, but X and Y have different chromatic numbers. To see this, we show that some deformations of graphs do not change the Z2-simple homotopy types of box complexes.