On the Shifted Littlewood-Richardson Coefficients and Littlewood-Richardson Coefficients

Abstract

We give a new interpretation of the shifted Littlewood-Richardson coefficients fλμ (λ,μ, are strict partitions). The coefficients gλμ which appear in the decomposition of Schur Q-function Qλ into the sum of Schur functions Qλ = 2l(λ)Σμgλμsμ can be considered as a special case of fλμ (here λ is a strict partition of length l(λ)). We also give another description for gλμ as the cardinal of a subset of a set that counts Littlewood-Richardson coefficients cμtμλ. This new point of view allows us to establish connections between gλμ and cμt μλ. More precisely, we prove that gλμ=gλμt, and gλμ ≤ cμtμλ. We conjecture that gλμ2 ≤ cλμtμ and formulate some conjectures on our combinatorial models which would imply this inequality if it is valid.