Exact solution of the one-dimensional spin-$\frac32$ Ising model in magnetic field

TL;DR

This paper provides an exact solution for the one-dimensional spin-3/2 Ising model in a magnetic field using algebraic and Green's function methods, revealing detailed thermodynamic properties.

Contribution

It introduces an exact solution for the 1D spin-3/2 Ising model in a magnetic field, extending previous solutions for lower spins and dimensions, with a novel parameter fixing procedure.

Findings

Exact expressions for Green's and correlation functions.

Magnetization and susceptibility as functions of temperature and field.

Comparison with lower spin cases showing consistent behavior.

Abstract

In this paper, we study the Ising model with general spin $S$ in presence of an external magnetic field by means of the equations of motion method and of the Green's function formalism. First, the model is shown to be isomorphic to a fermionic one constituted of $2S$ species of localized particles interacting via an intersite Coulomb interaction. Then, an exact solution is found, for any dimension, in terms of a finite, complete set of eigenoperators of the latter Hamiltonian and of the corresponding eigenenergies. This explicit knowledge makes possible writing exact expressions for the corresponding Green's function and correlation functions, which turn out to depend on a finite set of parameters to be self-consistently determined. Finally, we present an original procedure, based on algebraic constraints, to exactly fix these latter parameters in the case of dimension 1 and spin $\frac32$. For this latter case and, just for comparison, for the cases of dimension 1 and spin $\frac12$ [F. Mancini, Eur. Phys. J. B \textbf{45}, 497 (2005)] and spin 1 [F. Mancini, Eur. Phys. J. B \textbf{47}, 527 (2005)], relevant properties such as magnetization $<S>$ and square magnetic moment $<S^2 >$, susceptibility and specific heat are reported as functions of temperature and external magnetic field both for ferromagnetic and antiferromagnetic couplings. It is worth noticing the use we made of composite operators describing occupation transitions among the 3 species of localized particles and the related study of single, double and triple occupancy per site.