Exploring Homological Properties of Independent Complexes of Kneser Graphs
Abstract
We discuss the topological properties of the independence complex of Kneser graphs, Ind(KG(n, k)), with n≥ 3 and k≥ 1. By identifying one kind of maximal simplices through projective planes, we obtain homology generators for the 6-dimensional homology of the complex Ind(KG(3, k)). Using cross-polytopal generators, we provide lower bounds for the rank of p-dimensional homology of the complex Ind(KG(n, k)) where p=1/2· 2n+k 2n. Denote Fn[m] to be the collection of n-subsets of [m] equipped with the symmetric difference metric. We prove that if is the minimal integer with the qth dimensional reduced homology Hq(VR(F[]n; 2(n-1))) being non-trivial, then rank (Hq(VR(Fn[m]; 2(n-1)))≥ Σi=mi-2 -2· rank (Hq(VR(Fn[]; 2(n-1))). Since the independence complex Ind(KG(n, k)) and the Vietoris-Rips complex VR(F[2n+k]n; 2(n-1)) are the same, we obtain a homology propagation result in the setting of independence complexes of Kneser graphs. Connectivity of these complexes is also discussed in this paper.
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