Fused RSOS Lattice Models as Higher-Level Nonunitary Minimal Cosets

TL;DR

This paper explores the connection between fused RSOS lattice models and higher-level nonunitary minimal cosets, providing conjectures supported by analysis of one-dimensional sums and branching functions.

Contribution

It proposes a new conjecture linking fused RSOS models to higher-level cosets at fractional levels, supported by detailed analysis of one-dimensional sums and branching functions.

Findings

Fused RSOS models correspond to higher-level cosets at fractional levels.

One-dimensional sums match fractional level branching functions for small n.

Finitized bosonic branching functions agree with sums up to system size N=14.

Abstract

We consider the Forrester-Baxter RSOS lattice models with crossing parameter $\lambda=(m'\!-\!m)\pi/m'$ in Regime~III. In the continuum scaling limit, these models are described by the minimal models ${\cal M}(m,m')$. We conjecture that, for $\lambda<\pi/n$, the $n\times n$ fused RSOS models with $n\ge 2$ are described by the higher-level coset $(A^{(1)}_1)_k\otimes (A^{(1)}_1)_n/(A^{(1)}_1)_{k+n}$ at fractional level $k=nM/(M'\!-\!M)-2$ with $(M,M')=\big(nm-(n\!-\!1)m',m'\big)$. To support this conjecture, we investigate the one-dimensional sums arising from Baxter's off-critical corner transfer matrices. In unitary cases ($m=m'\!-\!1$) it is known that, up to leading powers of $q$, these coincide with the branching functions $b_{r,s,\ell}^{m'\!-n,m'\!,n}(q)$. For general nonunitary cases ($m<m'\!-\!1$), we identify the ground state one-dimensional RSOS paths and relate them to the quantum numbers $(r,s,\ell)$ in the various sectors. For $n=1,2,3$, we obtain the local energy functions $H(a,b,c)$ in a suitable gauge and verify that the associated one-dimensional sums produce finitized forms that converge, as $N$ becomes large, to the fractional level branching functions $b_{r,s,\ell}^{M,M'\!,n}(q)$. Extending the work of Schilling, we also conjecture finitized bosonic branching functions $b_{r,s,\ell}^{M,M'\!,n;(N)}(q)$ for general $n$ and check that these agree with the one-dimensional sums for $n=1,2,3$ out to system sizes $N=14$. Lastly, the finitized Kac characters $\chi_{r,s,\ell}^{P,P'\!,n;(N)}(q)$ of the $n\times n$ fused logarithmic minimal models ${\cal LM}(p,p')$ are obtained by taking the {\em logarithmic limit\/} $m,m'\to\infty$ with $m/m'\to p/p'+$.