On Signed Multiplicities of Schur Expansions Surrounding Petrie Symmetric Functions

Abstract

For k 1, the homogeneous symmetric functions G(k,m) of degree m defined by Σm 0 G(k,m) zm=Πi 1 (1+xiz+x2iz2+·s+xk-1izk-1) are called Petrie symmetric functions. As derived by Grinberg and Fu--Mei independently, the expansion of G(k,m) in the basis of Schur functions sλ turns out to be signed multiplicity free, i.e., the coefficients are -1, 0 and 1. In this paper we give a combinatorial interpretation of the coefficient of sλ in terms of the k-core of λ and a sequence of rim hooks of size k removed from λ. We further study the product of G(k,m) with a power sum symmetric function pn. For all n 1, we give necessary and sufficient conditions on the parameters k and m in order for the expansion of G(k,m)· pn in the basis of Schur functions to be signed multiplicity free. This settles affirmatively a conjecture of Alexandersson as the special case n=2.