Transition Matrices between Shifted t-Schur Bases and Cyclotomic Schur Q-Positivity

Abstract

For a strict partition λ, let Qλ(X;t)=Qλ[X-tX] be the shifted t-Schur function arising from the modified Greaves--Jing--Zhu operator on the odd power-sum ring. We study transition matrices between the shifted bases with parameters t and s. The relative scaling operator is diagonal in the odd power-sum basis, leading to explicit spectral data, determinant and trace formulas, weighted symmetry, a spin-character formula, and a transition Cauchy identity. For the cyclotomic specialization Cλμ[M](t)=Cλμ(tM,t), the relative operator becomes plethystic substitution by 1+t+·s+tM-1. We prove Schur Q-positivity and reciprocity, derive factorization and root-of-unity rank formulas, and give an exact computation method. For M=2, all one-row transitions are computed explicitly, and the nonzero coefficients are unimodal.