Combinatorics of solvable lattice models, and modular representations of Hecke algebras
Abstract
We review and motivate recently-observed relationships between exactly solvable lattice models and modular representations of Hecke algebras. Firstly, we describe how the set of n-regular partitions label both of the following classes of objects: 1. The spectrum of unrestricted solid-on-solid lattice models based on level-1 representations of the affine algebras n, 2. The irreducible representations of type-A Hecke algebras at roots of unity: Hm([n]1). Secondly, we show that a certain subset of the n-regular partitions label both of the following classes of objects: 1. The spectrum of restricted solid-on-solid lattice models based on cosets of affine algebras (sl(n)1 × sl(n)1)/ sl(n)2. 2. Jantzen-Seitz (JS) representations of Hm([n]1): irreducible representations that remain irreducible under restriction to Hm-1([n]1). Using the above relationships, we characterise the JS representations of Hm([n]1) and show that the generating series that count them are branching functions of affine n.
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