Neighborhood Complexes of induced k-independent graphs
Abstract
This paper is devoted to the neighborhood complexes of the induced k-independent graphs. Inspired by the surprising correspondence between total k-cut complex of n-cycle Cn and neighborhood complex of stable Kneser graph SG(n,k), we anticipate that the homotopy type of total cut complexes may have some relationships with the neighborhood complexes of induced k-independent graphs. We investigated the homotopy type of some total cut complexes and neighborhood complexes of some other graphs, using techniques from algebraic topology and discrete Morse theory.
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