Homotopy groups of Hom complexes of graphs

Abstract

The notion of ×-homotopy from DocHom is investigated in the context of the category of pointed graphs. The main result is a long exact sequence that relates the higher homotopy groups of the space *(G,H) with the homotopy groups of *(G,HI). Here *(G,H) is a space which parametrizes pointed graph maps from G to H (a pointed version of the usual complex), and HI is the graph of based paths in H. As a corollary it is shown that πi (*(G,H) ) [G,i H]×, where H is the graph of based closed paths in H and [G,K]× is the set of ×-homotopy classes of pointed graph maps from G to K. This is similar in spirit to the results of BBLL, where the authors seek a space whose homotopy groups encode a similarly defined homotopy theory for graphs. The categorical connections to those constructions are discussed.