Matthew Fayers
Published 2013-06-05, updated 2014-07-30Version 3
Let p be an odd prime, and A_n the alternating group of degree n. We determine which ordinary irreducible representations of A_n remain irreducible in characteristic p, verifying the author's conjecture from [Represent. Theory 14, 601-626]. Given the preparatory work done in [op. cit.], our task is to determine which self-conjugate partitions label Specht modules for the symmetric group in characteristic p having exactly two composition factors. This is accomplished through the use of the Robinson-Brundan-Kleshchev 'i-restriction' functors, together with known results on decomposition numbers for the symmetric group and additional results on the Mullineux map and homomorphisms between Specht modules.
Comments: Accepted for publication in Transactions of the American Mathematical Society. Many thanks to the referee
Sylow subgroups of symmetric and alternating groups and the vertex of $S^{(kp-p,1^p)}$ in characteristic $p$
Irreducible projective representations of the alternating group which remain irreducible in characteristic 2
The vertices and sources of the natural simple module for the alternating group in even characteristic
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