Diagonals and algebraicity modulo p: a sharper degree bound
Abstract
In 1984, Deligne proved that for any prime number p, the reduction modulo p of the diagonal of a multivariate algebraic power series with integer coefficients is algebraic over the field of rational functions with coefficients in Fp. Moreover, he conjectured that the algebraic degrees dp of these functions should grow at most polynomially in p. In this article, we provide a new and elementary proof of Deligne's theorem, which yields the first general polynomial bound on dp with an explicit and reasonable degree.
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