The Saxl Conjecture for Fourth Powers via the Semigroup Property

Abstract

The tensor square conjecture states that for n ≥ 10, there is an irreducible representation V of the symmetric group Sn such that V V contains every irreducible representation of Sn. Our main result is that for large enough n, there exists an irreducible representation V such that V 4 contains every irreducible representation. We also show that tensor squares of certain irreducible representations contain (1-o(1))-fraction of irreducible representations with respect to two natural probability distributions. Our main tool is the semigroup property, which allows us to break partitions down into smaller ones.