New cases of the Strong Stanley Conjecture

Abstract

We make progress towards understanding the structure of Littlewood-Richardson coefficients gλ,μ for products of Jack symmetric functions. Building on recent results of the second author, we are able to prove new cases of a conjecture of Stanley in which certain families of these coefficients can be expressed as a product of upper or lower hook lengths for every box in each of the partitions. In particular, we prove that conjecture in the case of a rectangular union, i.e. for gμ, σμ mn where σ is the complementary partition of σ = μ mn in the rectangular partition mn. We give a formula for these coefficients through an explicit prescription of such choices of hooks. Lastly, we conjecture an analogue of this conjecture of Stanley holds in the case of Shifted Jack functions.