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Modular representations and branching rules for wreath Hecke algebras
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Modular representations and branching rules for wreath Hecke algebras
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We introduce a generalization of degenerate affine Hecke algebra, called wreath Hecke algebra, associated to an arbitrary finite group G. The simple modules of the wreath Hecke algebra and of its associated cyclotomic algebras are classified over an algebraically closed field of any characteristic p. The modular branching rules for these algebras are obtained, and when p does not divide the order of G, they are further identified with crystal graphs of integrable modules for quantum affine algebras. The key is to establish an equivalence between a module category of the (cyclotomic) wreath Hecke algebra and its suitable counterpart for the degenerate affine Hecke algebra.
Forward citations
Cited by 2 Pith papers
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Higher-level affine wreath product algebras
Introduces higher-level affine wreath product algebras and higher-level affine Frobenius Hecke algebras as path algebras of new categories depending on a Frobenius superalgebra, unifying various higher-level construct...
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Higher-level affine wreath product algebras
Defines higher-level affine wreath product algebras and higher-level affine Frobenius Hecke algebras as path algebras of categories depending on a Frobenius superalgebra, yielding new analogues of degenerate affine He...
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