Skew Howe duality and random rectangular Young tableaux

Abstract

We consider the decomposition into irreducible components of the external power p(Cm Cn) regarded as a GLm×GLn-module. Skew Howe duality implies that the Young diagrams from each pair (λ,μ) which contributes to this decomposition turn out to be conjugate to each other, i.e.~μ=λ'. We show that the Young diagram λ which corresponds to a randomly selected irreducible component (λ,λ') has the same distribution as the Young diagram which consists of the boxes with entries ≤ p of a random Young tableau of rectangular shape with m rows and n columns. This observation allows treatment of the asymptotic version of this decomposition in the limit as m,n,p∞ tend to infinity.