The homotopy type of the clique complex of the partition graph
Abstract
For each positive integer n, let Gn be the graph whose vertices are the partitions of n, with edges corresponding to elementary transfers of one cell between two parts, followed by reordering. Let Kn := Cl(Gn) be the clique complex of Gn. We prove that Kn is homotopy equivalent to a wedge of 2-spheres. More precisely, Kn is homotopy equivalent to a wedge of bn copies of S2, where bn = (Kn) - 1. Thus the homotopy type of Kn is completely determined by its Euler characteristic. The proof has three main ingredients. First, we classify all cliques in Gn via two canonical families of simplices, called star-simplices and top-simplices, and use them to build a canonical cover of Kn. Second, we pass to the corresponding nerve, construct a second natural cover, and show via the intersection poset of that cover that Kn has the homotopy type of a CW-complex of dimension at most 2. Third, using an explicit height function on partitions, we prove that Kn is connected and simply connected. It follows that the reduced homology of Kn is concentrated in degree 2, where its rank is (Kn) - 1, and therefore Kn has the homotopy type claimed above. We conclude with remarks on Euler characteristics, small examples, and the integer sequences arising from these complexes.
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