From quantum difference equation to Dubrovin connection of affine type A quiver varieties

Abstract

This is the continuation of the article Z23. In this article we will give a detailed analysis of the quantum difference equation of the equivariant K-theory of the affine type A quiver varieties. We will give a good representation of the quantum difference operator ML(z) such that the monodromy operator Bm(z)in the formula can be written in the Uq(sl2)-form or in the Uq(gl1)-form. We also give the detailed analysis of the connection matrix for the quantum difference equation in the nodal limit p→0. Using these two results, we prove that the degeneration limit of the quantum difference equation is the Dubrovin connection for the quantum cohomology of the affine type A quiver varieties, and the monodromy representation for the Dubrovin connection is generated by the monodromy operators Bm.

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