On vertex-minimal simplicial maps to the sphere
Abstract
For positive integers n,d, let λ(n,d) be the minimal number of vertices of a triangulation of n-sphere which admits a degree d simplicial map onto the boundary of (n+1)-simplex. We show that for h=n+12, the function λ(n,d)h is almost linear in d as d∞ answering a question by O.Musin. All triangulations we obtain are isomorphic to boundaries of convex polytopes in Rn+1.
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