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On the size of k-irreducible triangulations

Published 20 Mar 2026 in cs.CG, cs.DM, and math.CO | (2603.20030v1)

Abstract: A triangulation of a surface is k-irreducible if every non-contractible curve has length at least k and any edge contraction breaks this property. Equivalently, every edge belongs to a non-contractible curve of length k and there are no shorter non-contractible curves. We prove that a k-irreducible triangulation of a surface of genus g has $O(k2g)$ triangles, which is optimal. This is an improvement over the previous best bound $k{O(k)} g2$ of Gao, Richter and Seymour [Journal of Combinatorial Theory, Series B, 1996].

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