English

Bezout-type Theorems for Differential Fields

Algebraic Geometry 2019-02-20 v2 Commutative Algebra Classical Analysis and ODEs Logic

Abstract

We prove analogs of the Bezout and the Bernstein-Kushnirenko-Khovanskii theorems for systems of algebraic differential conditions over differentially closed fields. Namely, given a system of algebraic conditions on the first ll derivatives of an nn-tuple of functions, which admits finitely many solutions, we show that the number of solutions is bounded by an appropriate constant (depending singly-exponentially on nn and ll) times the volume of the Newton polytope of the set of conditions. This improves a doubly-exponential estimate due to Hrushovski and Pillay. We illustrate the application of our estimates in two diophantine contexts: to counting transcendental lattice points on algebraic subvarieties of semi-abelian varieties, following Hrushovski and Pillay; and to counting the number of intersections between isogeny classes of elliptic curves and algebraic varieties, following Freitag and Scanlon. In both cases we obtain bounds which are singly-exponential (improving the known doubly-exponential bounds) and which exhibit the natural asymptotic growth with respect to the degrees of the equations involved.

Keywords

Cite

@article{arxiv.1501.03121,
  title  = {Bezout-type Theorems for Differential Fields},
  author = {Gal Binyamini},
  journal= {arXiv preprint arXiv:1501.03121},
  year   = {2019}
}

Comments

minor corrections

R2 v1 2026-06-22T08:00:12.457Z