Level, rank, and tensor growth of representations of symmetric groups

Abstract: We develop a theory of levels for irreducible representations of symmetric groups of degree $n$ analogous to the theory of levels for finite classical groups. A key property of level is that the level of a character, provided it is not too big compared to $n$, gives a good lower bound on its degree, and, moreover, every character of low degree is either itself of low level or becomes so after tensoring with the sign character. Furthermore, if $l_1$ and $l_2$ satisfy a linear upper bound in $n$, then the maximal level of composition factors of the tensor product of representations of levels $l_1$ and $l_2$ is $l_1+l_2$. To prove all of this in positive characteristic, we develop the notion of rank, which is an analogue of the notion of rank of cross-characteristic representations of finite classical groups. We show, using modular branching rules and degenerate affine Hecke algebras, that the level and the rank agree, as long as the level is not too large. We exploit Schur-Weyl duality, modular Littlewood-Richardson coefficients and tilting modules to prove a modular analogue of the Murnaghan-Littlewood theorem on Kronecker products for symmetric groups. As an application, we obtain representation growth results for both ordinary and modular representations of symmetric and alternating groups analogous to those for finite groups of Lie type.