Relativistic Toda lattice and equivariant K-homology of affine Grassmannian

Abstract

We investigate the phenomenon known as ``quantum equals affine'' in the setting of T-equivariant quantum K-theory of the flag variety G/B, as established by Kato for any semisimple algebraic group G. In particular, we focus on the K-Peterson isomorphism between the T-equivariant quantum K-ring QKT(SLn(C)/B) and the T-equivariant K-homology ring K*T(GrSLn) of the affine Grassmannian, after suitable localizations on both sides. Building on an earlier work by Ikeda, Iwao, and Maeno, we present an explicit algebraic realization of the K-Peterson map via a rational substitution that sends the generators of the quantum K-theory ring to explicit rational expressions in the fundamental generators of K*T(GrSLn), thereby matching the Schubert bases on both sides. Our approach builds on recent developments in the theory of QKT(SLn(C)/B) by Maeno, Naito, and Sagaki, as well as the theory of K-theoretic double k-Schur functions introduced by Ikeda, Shimozono, and Yamaguchi. This concrete formulation provides new insight into the combinatorial structure of the K-Peterson isomorphism in the equivariant setting. As an application, we establish a factorization formula for the K-theoretic double k-Schur function associated with the maximal k-irreducible k-bounded partition.