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Type: Article
On the concentration of points of polynomial maps and applications
Abstract:
For a polynomial f is an element of F-p[X] we obtain upper bounds on the number of points (x, f (x)) modulo a prime p which belong to an arbitrary square with the side length H. Our results in particular are based on the Vinogradov mean value theorem. Using these estimates we obtain results on the expansion of orbits in dynamical systems generated by nonlinear polynomials and we obtain an asymptotic formula for the number of visible points on the curve f(x) equivalent to y (mod p), where f is an element of F-p[X] is a polynomial of degree d >= 2. We also use some recent results and techniques from arithmetic combinatorics to study the values (x, f (x)) in more general sets.
For a polynomial f is an element of F-p[X] we obtain upper bounds on the number of points (x, f (x)) modulo a prime p which belong to an arbitrary square with the side length H. Our results in particular are based on the Vinogradov mean value theorem. Using these estimates we obtain results on the expansion of orbits in dynamical systems generated by nonlinear polynomials and we obtain an asymptotic formula for the number of visible points on the curve f(x) equivalent to y (mod p), where f is an element of F-p[X] is a polynomial of degree d >= 2. We also use some recent results and techniques from arithmetic combinatorics to study the values (x, f (x)) in more general sets.
Keywords: Polynomial congruences; Vinogradov mean value theorem; Additive combinatorics; Orbits; Visible points
MSC: 37Pxx (11B50)
Journal: Mathematische Zeitschrift
ISSN: 1432-1823
Year: 2012
Volume: 272
Number: 3-4
Pages: 825-837
Created: 2013-01-25 12:03:28
Modified: 2014-02-13 11:49:21
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