On the Gap Between the Co-Indices of a Free Z2-Space and Its Suspension

Abstract

For a free Z2-space X, the co-index coind(X) is the largest integer m for which there exists a Z2-equivariant map Sm X, where Sm carries the antipodal action. Since suspension sends such a map to a Z2-equivariant map Sm+1 S(X), one always has coind(S(X)) ≥ coind(X)+1. We prove that the excess over this lower bound can be arbitrarily large. More precisely, for every n ≥ 2, we construct a finite free n-dimensional simplicial Z2-complex K such that coind(K)=1 and coind(S(K))=n+1. This answers a question of Simonyi, Tardos, and Vrécica on the possible growth of co-index under suspension and, equivalently, shows that the co-index lower bound on the chromatic number of a graph G obtained from B0(G) can exceed the corresponding bound obtained from the box complex B(G) by an arbitrarily large amount.

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