Frobenius difference equations and algebraic independence of zeta values in positive equal characteristic

Abstract

In analogy with the Riemann zeta function at positive integers, for each finite field Fpr with fixed characteristic p we consider Carlitz zeta values zetar(n) at positive integers n. Our theorem asserts that among the zeta values in zetar(1), zetar(2), zetar(3), ... | r = 1, 2, 3, ..., all the algebraic relations are those algebraic relations within each individual family zetar(1), zetar(2), zetar(3), .... These are the algebraic relations coming from the Euler-Carlitz relations and the Frobenius relations. To prove this, a motivic method for extracting algebraic independence results from systems of Frobenius difference equations is developed.