Exact solution of a two-dimensional (2D) Ising model with the next nearest interactions

TL;DR

This paper derives the exact solution for a 2D Ising model with next nearest interactions, analyzing topological structures and modifications of 3D approaches, providing insights into magnetic materials.

Contribution

It presents the first exact solution for a 2D Ising model with next nearest interactions, including partition function and magnetization, using novel algebraic and tensor methods.

Findings

Increasing interactions or topological contributions raises the critical point.

The solution reveals how extended interactions affect phase transitions.

Results aid understanding of 2D magnetic material properties.

Abstract

The exact solution of a two-dimensional (2D) Ising model with the next nearest interactions at zero magnetic field is derived. At first, the transfer matrices are analyzed in three representations, i.e., Clifford algebraic representation, transfer tensor representation and schematic representation, to inspect nontrivial topological structures in this system. The system is equivalent to a triangular Ising model plus an interaction along the z axis, so that the approaches developed for the 3D Ising model are modified to be appropriable for solving the exact solution of the 2D Ising model with the next nearest interactions. The partition function and the spontaneous magnetization are obtained. The comparison with the exact solutions of other Ising lattices reveals that either the increase of the number of interactions in a unit cell or the presence/increase of topological contributions enhances the critical point of the Ising lattices. The results obtained in this work are helpful for understanding the physical properties of the 2D magnetic materials.