On a Class of Orthogonal-Invariant Quantum Spin Systems on the Complete Graph

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 Björnberg, 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 pa… Show more