arXiv:2101.09319 Abstract | arXiv Analytics

arXiv:2101.09319 [math.CO]Abstract References Reviews Resources

On a conjecture of Gross, Mansour and Tucker

Published 2021-01-22Version 1

Partial duality is a duality of ribbon graphs relative to a subset of their edges generalizing the classical Euler-Poincare duality. This operation often changes the genus. Recently J.L.Gross, T.Mansour, and T.W.Tucker formulated a conjecture that for any ribbon graph different from plane trees and their partial duals, there is a subset of edges partial duality relative to which does change the genus. A family of counterexamples was found by Qi Yan and Xian'an Jin. In this note we prove that essentially these are the only counterexamples.

Categories: math.CO, math.GT

Subjects: 05C10, 05C65, 57M15, 57Q15

Keywords: conjecture, ribbon graph, qi yan, classical euler-poincare duality, counterexamples

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