Outside nested decompositions of skew diagrams and Schur function determinants

Abstract

In this paper we describe the thickened strips and the outside nested decompositions of any skew shape λ/μ. For any such decomposition =(1,2,…,g) of the skew shape λ/μ where i is a thickened strip for every i, if r is the number of boxes that are contained in any two distinct thickened strips of , we establish a determinantal formula of the function sλ/μ(X)p1r(X) with the Schur functions of thickened strips as entries, where sλ/μ(X) is the Schur function of the skew shape λ/μ and p1r(X) is the power sum symmetric function index by the partition (1r). This generalizes Hamel and Goulden's theorem on the outside decompositions of the skew shape λ/μ. As an application of our theorem, we derive the number of m-strip tableaux which was first counted by Baryshnikov and Romik via extending the transfer operator approach due to Elkies.