Frobenius intertwiners for q-difference equations

Abstract

We consider a class of q-hypergeometric equations describing the quantum difference equation for the cotangent bundles over projective spaces X=T*Pn-1 . We show that over Qp these equations are equipped with the Frobenius action (q,z) (qp,zp). We obtain an explicit formula for the constant term of the Frobenius intertwiner in terms of the p-adic q-gamma function of Koblitz. In the limit q 1 we arrive at the Frobenius structures for the p-adic hypergeometric and Bessel differential equations studied by Dwork. In particular, we find closed formulas for p-adic constants appearing in works of Dwork and Sperber in terms of p-adic zeta functions.

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