On the number of constituents of induced modules of Ariki-Koike algebras
Abstract
We examine the crystal graph of the sle-module arising from an sle-categorification to study the defining endo-functors of the categorification. This yields lower bounds on the number of irreducible constituents of certain objects. We use Ariki's categorification result on Ariki-Koike algebras to obtain a new lower bound on the number of constituents of their parabolically induced modules. In particular this will imply reducibility of every induced module.
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