Minimal simplicial degree d self-maps of Sn-1× S1
Abstract
The degree of a map between orientable manifolds is a fundamental concept in topology, providing important information about the structure of manifolds and the behavior of maps between them. A simplicial cell complex K is called a colored triangulation of a closed PL n-manifold M if the 1-skeleton of K admits a proper vertex-coloring with n+1 colors and |K| is PL-homeomorphic to M. In this article, we construct, for every d ∈ Z and n ≥ 2, a degree d simplicial map from a (2(n+1)\|d|,1\)-facet colored triangulation of Sn-1 × S1 to the standard 2(n+1)-facet colored triangulation of Sn-1 × S1. Additionally, for every d ∈ Z and n ≥ 2, we construct a degree d simplicial map from a (2\|d|,1\)-facet colored triangulation of Sn to the standard 2-facet colored triangulation of Sn. For M = Sn-1 × S1 and Sn, with n ≥ 2, these simplicial degree d self-maps of M are minimal with respect to their standard colored triangulations, in the sense that there does not exist a colored triangulation K of M with fewer facets than the constructed one that admits a simplicial map f : K K' of degree d, where K' denotes the standard colored triangulation of M.
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