Schurifying quasi-hereditary algebras

Abstract

We define and study new classes of quasi-hereditary and cellular algebras which generalize Turner's double algebras. Turner's algebras provide a local description of blocks of symmetric groups up to derived equivalence. Our general construction allows one to `schurify' any quasi-hereditary algebra A to obtain a generalized Schur algebra SA(n,d) which we prove is again quasi-hereditary if d≤ n. We describe decomposition numbers of SA(n,d) in terms of those of A and the classical Schur algebra S(n,d). In fact, it is essential to work with quasi-hereditary superalgebras A, in which case the construction of the schurification involves a non-trivial full rank sub-lattice TAa(n,d)⊂eq SA(n,d).