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Ax's theorem with an additive character - MaRDI portal

Ax's theorem with an additive character

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Publication:6328455

DOI10.4171/EMSS/47arXiv1911.01096MaRDI QIDQ6328455

Ehud Hrushovski

Publication date: 4 November 2019

Abstract: Motivated by Emmanuel Kowalski's exponential sums over definable sets in finite fields, we generalize Ax's theorem on pseudo-finite fields to a continuous-logic setting allowing for an additive character. The role played by Weil's Riemann hypothesis for curves over finite fields is taken by the `Weil bound' on exponential sums. Subsequent model-theoretic developments, including simplicity and the Chatzidakis-Van den Dries-Macintyre definable measures, also generalize. Analytically, we have the following consequence: consider the algebra of functions FfpnoCc obtained from the additive characters and the characteristic functions of subvarieties by pre- or post-composing with polynomials, applying min and sup operators to the real part, and averaging over subvarieties. Then any element of this class can be approximated, uniformly in the variables and in the prime p, by a polynomial expression in Psip(xi) at certain algebraic functions xi of the variables, where Psi(nmodp)=exp(2piin/p) is the standard additive character.












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