I. Lyberg scite author profile

We present numerical results for the six-vertex model with a variety of boundary conditions. Adapting an algorithm proposed by Allison and Reshetikhin [14] for domain wall boundary conditions, we examine some modifications of these boundary conditions. To be precise, we discuss partial domain wall boundary conditions, reflecting ends and half turn boundary conditions (domain wall boundary conditions with half turn symmetry). arXiv:1711.07905v2 [cond-mat.stat-mech] 9 May 2018

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The Fourth Virial Coefficient of a Fluid of Hard Spheres in Odd Dimensions

Lyberg

2005

J Stat Phys

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The density profile of the six vertex model with domain wall boundary conditions

Lyberg¹,

Korepin²,

Viti³

2017

J. Stat. Mech.

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Abstract. We study numerically the density profile in the six-vertex model with domain wall boundary conditions. Using a Monte Carlo algorithm originally proposed by Allison and Reshetikhin we numerically evaluate the inhomogeneous density profiles in the disordered and antiferromagnetic regimes where frozen corners appear. At the free fermion point we present an exact finite-size formula for the density on the horizontal edges that relies on the imaginary time transfer matrix approach. In all cases where exact analytic forms for the density and the arctic curves are known the numerical method shows perfect agreement with them. This also suggests the possibility of its use for accurate quantitative purposes. ‡

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I. Lyberg

Form factor expansion of the row and diagonal correlation functions of the two-dimensional Ising model

Phase separation in the six-vertex model with a variety of boundary conditions

The Fourth Virial Coefficient of a Fluid of Hard Spheres in Odd Dimensions

The density profile of the six vertex model with domain wall boundary conditions

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