Categorification of Wedderburn's basis for C[Sn]

Abstract

M. Neunh\"offer studies in Ne a certain basis of C[Sn] with the origins in Lu and shows that this basis is in fact Wedderburn's basis. In particular, in this basis the right regular representation of Sn decomposes into a direct sum of irreducible representations (i.e. Specht or cell modules). In the present paper we rediscover essentially the same basis with a categorical origin coming from projective-injective modules in certain subcategories of the BGG-category O. An important role in our arguments is played by the dominant projective module in each of these categories. As a biproduct of the study of this dominant projective module we show that Kostant's problem (Jo) has a negative answer for some simple highest weight module over the Lie algebra sl4, which disproves the general belief that Kostant's problem should have a positive answer for all simple highest weight modules in type A.