Diagonalization and Rationalization of algebraic Laurent series

Abstract

We prove a quantitative version of a result of Furstenberg and Deligne stating that the the diagonal of a multivariate algebraic power series with coefficients in a field of positive characteristic is algebraic. As a consequence, we obtain that for every prime p the reduction modulo p of the diagonal of a multivariate algebraic power series f with integer coefficients is an algebraic power series of degree at most pA and height at most A2pA+1, where A is an effective constant that only depends on the number of variables, the degree of f and the height of f. This answers a question raised by Deligne.