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Twenty Vertex model and domino tilings of the Aztec triangle

Published 4 Feb 2021 in math.CO, cond-mat.stat-mech, math-ph, and math.MP | (2102.02920v1)

Abstract: We show that the number of configurations of the 20 Vertex model on certain domains with domain wall type boundary conditions is equal to the number of domino tilings of Aztec-like triangles, proving a conjecture from [P. Di Francesco and E. Guitter, Twenty-Vertex Model with Domain Wall Boundaries and Domino Tilings, Elec. Jour. of Combinatorics 27 (2020), no. 2, P2.13]. The result is based on the integrability of the 20 Vertex model and uses a connection to the U-turn boundary 6 Vertex model to re-express the number of 20 Vertex configurations as a simple determinant, which is then related to a Lindstr\"om-Gessel-Viennot determinant for the domino tiling problem. The common number of configurations is conjectured to be $2{n(n-1)/2}\prod_{j=0}{n-1}\frac{(4j+2)!}{(n+2j+1)!}=1, 4, 60, 3328, 678912...$ The enumeration result is extended to include refinements of both numbers.

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