Bidilatation of Small Littlewood-Richardson Coefficients

Abstract

The Littlewood-Richardson coefficients cλ,μ are the multiplicities in the tensor product decomposition of two irreducible representations of the general linear group GL(n, C). They are parametrized by the triples of partitions (λ, μ, ) of length at most n. By the so-called Fulton conjecture, if cλ,μ=1 then ckkλ,kμ= 1, for any k ≥ 0. Similarly, as proved by Ikenmeyer or Sherman, if cλ,μ=2 then ckkλ,kμ = k + 1, for any k≥ 0. Here, given a partition λ, we set λ(p, q) = p(qλ')' , where prime denotes the conjugate partition. We observe that Fulton's conjecture implies that if cλ,μ=1 then c(p,q)λ(p,q),μ(p,q)=1, for any p, q ≥ 0. Our main result is that if cλ,μ=2 then c(p,q)λ(p,q),μ(p,q) is the binomial pmatrix p+q\\ q pmatrix, for any p, q ≥ 0.