Email this article Counting lattice triangulations: Fredholm equations in combinatorics
- Authors: Orevkov S.Y.1
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Affiliations:
- Steklov Mathematical Institute of Russian Academy of Sciences
- Issue: Vol 213, No 11 (2022)
- Pages: 50-78
- Section: Articles
- URL: https://bakhtiniada.ru/0368-8666/article/view/133493
- DOI: https://doi.org/10.4213/sm9727
- ID: 133493
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Abstract
Let $f(m,n)$ be the number of primitive lattice triangulations of an $m\times n$ rectangle. We compute the limits $\lim_n f(m,n)^{1/n}$ for $m=2,3$. For $m=2$ we obtain the exact value of the limit, which is $(611+\sqrt{73})/36$. For $m=3$ we express the limit in terms of a certain Fredholm integral equation for generating functions. This provides a polynomial-time algorithm (with respect to the number of computed digits) for the computation of the limit with any prescribed precision. Bibliography: 13 titles.
About the authors
Stepan Yur'evich Orevkov
Steklov Mathematical Institute of Russian Academy of Sciences
Email: orevkov@math.ups-tlse.fr
Candidate of physico-mathematical sciences, Senior Researcher
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