Toda-Type Presentations for the Quantum K Theory of Partial Flag Varieties

Abstract

We prove a determinantal, Toda-type, presentation for the equivariant K theory of a partial flag variety Fl(r1, …, rk;n). The proof relies on pushing forward the Toda presentation obtained by Maeno, Naito and Sagaki for the complete flag variety Fl(n), via Kato's KT( pt)-algebra homomorphism from the quantum K ring of Fl(n) to that of Fl(r1, …, rk;n). Starting instead from the Whitney presentation for Fl(n), we show that the same pushforward technique gives a recursive formula for polynomial representatives of quantum K Schubert classes in any partial flag variety which do not depend on quantum parameters. In an appendix, we include another proof of the Toda presentation for the equivariant quantum K ring of Fl(n), following Anderson, Chen, and Tseng, which is based on the fact that the K-theoretic J-function is an eigenfunction of the finite difference Toda Hamiltonians.

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