Nonvanishing of Kronecker coefficients for rectangular shapes

Abstract

We prove that for any partition (λ1,...,λd2) of size d there exists k 1 such that the tensor square of the irreducible representation of the symmetric group Sk d with respect to the rectangular partition (k,...,k) contains the irreducible representation corresponding to the stretched partition (kλ1,...,kλd2). We also prove a related approximate version of this statement in which the stretching factor k is effectively bounded in terms of d. This investigation is motivated by questions of geometric complexity theory.