Mathematics – Quantum Algebra
Scientific paper
2002-12-27
Mathematics
Quantum Algebra
46 pages
Scientific paper
For all $k$, we construct a bijection between the set of sequences of non-negative integers ${\bf a}=(a_i)_{i\in{\bf Z}_{\geq0}}$ satisfying $a_i+a_{i+1}+a_{i+2}\leq k$ and the set of rigged partitions $(\lambda,\rho)$. Here $\lambda=(\lambda_1,...,\lambda_n)$ is a partition satisfying $k\geq\lambda_1\geq...\geq\lambda_n\geq1$ and $\rho=(\rho_1,...,\rho_n)\in{\bf Z}_{\geq0}^n$ is such that $\rho_j\geq\rho_{j+1}$ if $\lambda_j=\lambda_{j+1}$. One can think of $\lambda$ as the particle content of the configuration ${\bf a}$ and $\rho_j$ as the energy level of the $j$-th particle, which has the weight $\lambda_j$. The total energy $\sum_iia_i$ is written as the sum of the two-body interaction term $\sum_{j
Feigin BL
Jimbo Masakazu
Miwa Tadahiro
Mukhin Evgeny
Takeyama Yoshihiro
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