On vanishing coefficients of algebraic power series over fields of positive characteristic

Abstract

Let K be a field of characteristic p>0 and let f(t1,...,td) be a power series in d variables with coefficients in K that is algebraic over the field of multivariate rational functions K(t1,...,td). We prove a generalization of both Derksen's recent analogue of the Skolem-Mahler-Lech theorem in positive characteristic and a classical theorem of Christol, by showing that the set of indices (n1,...,nd)∈ Nd for which the coefficient of t1n1...tdnd in f(t1,...,td) is zero is a p-automatic set. Applying this result to multivariate rational functions leads to interesting effective results concerning some Diophantine equations related to S-unit equations and more generally to the Mordell--Lang Theorem over fields of positive characteristic.