On the Quantum K-theory of Quiver Varieties at Roots of Unity

Abstract

Let Ψ(z,a,q) a the fundamental solution matrix of the quantum difference equation of a Nakajima variety X. In this work, we prove that the operator Ψ(z,a,q) Ψ(zp,ap,qp2)-1 has no poles at the primitive complex p-th roots of unity q=ζp. As a byproduct, we show that the iterated product of the operators ML(z,a,q ) from the q-difference equation on X: ML (z q(p-1)L,a,q) ·s ML (z qL,a,q) ML (z ,a,q) evaluated at q=ζp has the same eigenvalues as ML (zp,ap,qp). Upon a reduction of the quantum difference equation of X to the quantum differential equation over the field of finite characteristic, the above iterated product transforms into a Grothendiek-Katz p-curvature of the corresponding quantum connection whreas ML (zp,ap,qp) becomes a certain Frobenius twist of that connection. In this way, we give an explicit description of the spectrum of the p-curvature of quantum connection for Nakajima varieties.