Borsuk--Ulam property for graphs II: The Zn-action
Abstract
For a finite group H and connected topological spaces X and Y such that X is endowed with a free left H-action τ, we provide a geometric condition in terms of the existence of a commutative diagram of spaces (arising from the triple (X,Y;τ)) to decide whether the Borsuk--Ulam property holds for based homotopy classes α∈[X,Y]0, as well as for free homotopy classes α∈[X,Y]. Here, a homotopy class α is said to satisfy the Borsuk--Ulam property if, for each of its representatives f∈α, there exists an H-orbit where f fails to be injective. Our geometric characterization is attained by constructing an H-equivariant map from X to the classical configuration space F|H|(Y). We derive an algebraic condition from the geometric characterisation, and show that the former one is in fact equivalent to the latter one when X and Y are aspherical. We then specialize to the 1-dimensional case, i.e., when X is an arbitrary connected graph, H is cyclic, and Y is either an interval, a circle, or their wedge sum. The graph-braid-group ingredient in our characterizations is then effectively controlled through the use of discrete Morse theory.
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