English

Counting Planar Eulerian Orientations

Combinatorics 2020-02-18 v3

Abstract

Inspired by the paper of Bonichon, Bousquet-M\'elou, Dorbec and Pennarun, we give a system of functional equations which characterise the ordinary generating function, U(x),U(x), for the number of planar Eulerian orientations counted by edges. We also characterise the ogf A(x)A(x), for 4-valent planar Eulerian orientations counted by vertices in a similar way. The latter problem is equivalent to the 6-vertex problem on a random lattice, widely studied in mathematical physics. While unable to solve these functional equations, they immediately provide polynomial-time algorithms for computing the coefficients of the generating function. From these algorithms we have obtained 100 terms for U(x)U(x) and 90 terms for A(x).A(x). Analysis of these series suggests that they both behave as const(1μx)/log(1μx),const\cdot (1 - \mu x)/\log(1 - \mu x), where we conjecture that μ=4π\mu = 4\pi for Eulerian orientations counted by edges and μ=43π\mu=4\sqrt{3}\pi for 4-valent Eulerian orientations counted by vertices.

Keywords

Cite

@article{arxiv.1707.09120,
  title  = {Counting Planar Eulerian Orientations},
  author = {Andrew Elvey Price and Anthony J Guttmann},
  journal= {arXiv preprint arXiv:1707.09120},
  year   = {2020}
}

Comments

26 pages, 20 figures

R2 v1 2026-06-22T20:59:49.057Z