Abstract
Gordon James proved that the socle of a Weyl module of a classical Schur algebra is a sum of simple modules labelled by p p -restricted partitions. We prove an analogue of this result in the very general setting of “Schur pairs”. As an application we show that the socle of a Weyl module of a cyclotomic q q -Schur algebra is a sum of simple modules labelled by Kleshchev multipartitions and we use this result to prove a conjecture of Fayers that leads to an efficient LLT algorithm for the higher level cyclotomic Hecke algebras of type A A . Finally, we prove a cyclotomic analogue of the Carter-Lusztig theorem.
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