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The representation theory of seam algebras

Published 8 Sep 2019 in math-ph, math.MP, and math.RT | (1909.03499v2)

Abstract: The boundary seam algebras $\mathsf{b}{n,k}(\beta=q+q{-1})$ were introduced by Morin-Duchesne, Ridout and Rasmussen to formulate algebraically a large class of boundary conditions for two-dimensional statistical loop models. The representation theory of these algebras $\mathsf{b}{n,k}(\beta=q+q{-1})$ is given: their irreducible, standard (cellular) and principal modules are constructed and their structure explicited in terms of their composition factors and of non-split short exact sequences. The dimensions of the irreducible modules and of the radicals of standard ones are also given. The methods proposed here might be applicable to a large family of algebras, for example to those introduced recently by Flores and Peltola, and Cramp\'e and Poulain d'Andecy.

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