The p-adic approximations of vertex functions via 3D-mirror symmetry

Abstract

Using the 3D mirror symmetry we construct a system of polynomials Ts(z) with integral coefficients which solve the quantum differential equitation of X=T* Gr(k,n) modulo ps, where p is a prime number. We show that the sequence Ts(z) converges in the p-adic norm to the Okounkov's vertex function of X as s ∞. We prove that Ts(z) satisfy Dwork-type congruences which lead to a new infinite product presentation of the vertex function modulo ps.