Neutral-Fermion constructions of factorial gp-and gq-Functions
Abstract
We develop neutral-fermionic constructions for the factorial gp-and gq-functions introduced by Nakagawa and Naruse, which are respectively dual to the factorial GQ- and GP-functions of Ikeda and Naruse. In particular, we realize the factorial GP-, GQ- and gq-functions as vacuum expectation values. As applications, we obtain, Jacobi--Trudi type determinantal formulas for the transition coefficients between functions with different equivariant parameters for gq and its dual GP, as well as a Pfaffian formula for the factorial gq-functions. We further prove a remarkable coincidence among the transition coefficients for parameter changes for gp, gq, GQ, and GP. These coefficients admit a description in terms of factorial Grothendieck polynomials of type A.
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