An algorithmic discrete gradient field and the cohomology algebra of configuration spaces of two points on complete graphs
Abstract
We introduce an algorithm that constructs a discrete gradient field on any simplicial complex. We show that, in all situations, the gradient field is maximal possible and, in a number of cases, optimal. We make a thorough analysis of the resulting gradient field in the case of Munkres' discrete model for Conf(Km,2), the configuration space of ordered pairs of non-colliding particles on the complete graph Km on m vertices. Together with the use of Forman's discrete Morse theory, this allows us to describe in full the cohomology R-algebra H*(Conf(Km,2);R) for any commutative unital ring R. As an application we prove that, although Conf(Km,2) is outside the "stable" regime, all its topological complexities are maximal possible when m≥4.
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