Borsuk-Ulam property for graphs

Abstract

For finite connected graphs and G, with admitting a free involution τ, we characterize the based homotopy classes α∈[,G] for which the Borsuk-Ulam property holds in the sense of Goncalves, Guaschi and Casteluber-Laass, i.e., the homotopy classes α so that each of its representatives f∈α satisfies f(x) = f(τ· x) for some x∈. This is attained through a graph-braid-group perspective aided by the use of discrete Morse theory.

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