Asymptotics of the number of lattice triangulations of rectangles of width 4 and 5

Stepan Orevkov

Published 2024-12-22Version 1

Let $f(m,n)$ be the number of primitive lattice triangulations of an $m \times n$ rectangle. We express the limits $\lim_n f(m,n)^{1/n}$ for $m = 4$ and $m=5$ in terms of certain systems of Fredholm integral equations on generating functions (the case $m\le3$ was treated in a previous paper). Solving these equations numerically, we compute approximate values of these limits with a rather high precision.