Triangulated spheres with holes in triangulated surfaces

Abstract

Let Sh denote a sphere with h holes. Given a triangulation G of a surface M, we consider the question of when G contains a spanning subgraph H such that H is a triangulated Sh. We give a new short proof of a theorem of Nevo and Tarabykin that every triangulation G of the torus contains a spanning subgraph which is a triangulated cylinder. For arbitrary surfaces, we prove that every high facewidth triangulation of a surface with h handles contains a spanning subgraph which is a triangulated S2h. We also prove that for every 0 ≤ g' < g and w ∈ N, there exists a triangulation of facewidth at least w of a surface of Euler genus g that does not have a spanning subgraph which is a triangulated Sg'. Our results are motivated by, and have applications for, rigidity questions in the plane.

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