# Limit shapes for the asymmetric five vertex model

**Authors:** Jan de Gier, Richard Kenyon, Samuel S. Watson

arXiv: 1812.11934 · 2022-06-10

## TL;DR

This paper derives explicit limit shapes for the asymmetric five-vertex model by computing free energy and surface tension, applying a variational principle, and solving the resulting Euler-Lagrange equations.

## Contribution

It introduces a variational approach and explicit solutions for limit shapes in the five-vertex model, expanding understanding of non-intersecting lattice path models.

## Key findings

- Explicit formulas for free energy and surface tension.
- Analytic parameterization of limit shapes.
- Euler-Lagrange equations integrated for explicit solutions.

## Abstract

We compute the free energy and surface tension function for the five-vertex model, a model of non-intersecting monotone lattice paths on the grid in which each corner gets a positive weight. We give a variational principle for limit shapes in this setting, and show that the resulting Euler-Lagrange equation can be integrated, giving explicit limit shapes parameterized by analytic functions.

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Source: https://tomesphere.com/paper/1812.11934