Symmetrizing Tableaux and the 5th case of the Foulkes Conjecture

Abstract

The Foulkes conjecture states that the multiplicities in the plethysm Syma(Symb V) are at most as large as the multiplicities in the plethysm Symb(Syma V) for all a <= b. This conjecture has been known to be true for a <= 4. The main result of this paper is its verification for a = 5. This is achieved by performing a combinatorial calculation on a computer and using a propagation theorem of Tom McKay from 2008. Moreover, we obtain a complete representation theoretic decomposition of the vanishing ideal of the 5th Chow variety in degree 5, we show that there are no degree 5 equations for the 6th Chow variety, and we also find some representation theoretic degree 6 equations for the 6th Chow variety.