A Shifted $t$-Schur Weight from the Modified Odd Operator
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Abstract
We study the one-time weight on strict partitions obtained from the modified odd Greaves--Jing--Zhu operator. The shifted $t$-Schur functions generated by this operator are obtained from the classical Schur $Q$-functions by the plethystic substitution $X\mapsto X-tX$. Thus the corresponding weight \[
\lambda \longmapsto \mathcal Q_\lambda(X;t)P_\lambda(Y) \] is a shifted Schur weight with a virtual first alphabet. We give its normalization, its Pfaffian correlation kernel, its Fredholm Pfaffian for the largest part, and its size cumulants. For $t=-q$ with $q\geq 0$ the virtual alphabet becomes the positive alphabet $X+qX$, giving a genuine probability measure. This positive specialization is the one-time marginal of the two-color lift considered in a companion note.