Leading terms of relations for standard modules of affine Lie algebras Cn(1)
Abstract
In this paper we give a combinatorial parametrization of leading terms of defining relations for level k standard modules for affine Lie algebra of type Cn(1). Using this parametrization we conjecture colored Rogers-Ramanujan type combinatorial identities for n≥ 2 and k≥ 2; the identity in the case n=k=1 is equivalent to one of Capparelli's identities.
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