On a class of orthogonal-invariant quantum spin systems on the complete graph

TL;DR

This paper analyzes a family of orthogonal-invariant quantum spin systems on the complete graph, deriving explicit free energy formulas, phase diagrams, and critical temperatures for various spin values, using algebraic characterizations.

Contribution

It provides explicit free energy formulas and phase diagrams for a broad class of orthogonal-invariant quantum spin systems, extending previous models and techniques.

Findings

Explicit free energy formulas for spin 1/2 and 1 systems.

Phase diagrams and critical temperatures identified.

Heuristics for extremal Gibbs states in different regions.

Abstract

We study a two-parameter family of quantum spin systems on the complete graph, which is the most general model invariant under the complex orthogonal group. In spin $S=\frac{1}{2}$ it is equivalent to the XXZ model, and in spin $S=1$ to the bilinear-biquadratic Heisenberg model. The paper is motivated by the work of Bj\"ornberg, whose model is invariant under the (larger) complex general linear group. In spin $S=\frac{1}{2}$ and $S=1$ we give an explicit formula for the free energy for all values of the two parameters, and for spin $S>1$ for when one of the parameters is non-negative. This allows us to draw phase diagrams, and determine critical temperatures. For spin $S=\frac{1}{2}$ and $S=1$, we give the left and right derivatives as the strength parameter of a certain magnetisation term tends to zero, and we give a formula for a certain total spin observable, and heuristics for the set of extremal Gibbs states in several regions of the phase diagrams, in the style of a recent paper of Bj\"ornberg, Fr\"ohlich and Ueltschi. The key technical tool is expressing the partition function in terms of the irreducible characters of the symmetric group and the Brauer algebra. The parameters considered include, and go beyond, those for which the systems have probabilistic representations as interchange processes.