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EXPANSION OF ORBITS OF SOME DYNAMICAL SYSTEMS OVER FINITE FIELDS

Part of: Arithmetic and non-Archimedean dynamical systems Ergodic theory Elementary number theory

Published online by Cambridge University Press:  07 April 2010

JAIME GUTIERREZ  and
IGOR E. SHPARLINSKI
JAIME GUTIERREZ
Affiliation:
Department of Applied Mathematics and Computer Science, University of Cantabria, E-39071 Santander, Spain (email: jaime.gutierrez@unican.es)
IGOR E. SHPARLINSKI*
Affiliation:
Department of Computing, Macquarie University, Sydney, NSW 2109, Australia (email: igor@comp.mq.edu.au)
*
For correspondence; e-mail: igor@comp.mq.edu.au
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Abstract

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Given a finite field 𝔽p={0,…,p−1} of p elements, where p is a prime, we consider the distribution of elements in the orbits of a transformation ξψ(ξ) associated with a rational function ψ∈𝔽p(X). We use bounds of exponential sums to show that if Np1/2+ε for some fixed ε then no N distinct consecutive elements of such an orbit are contained in any short interval, improving the trivial lower bound N on the length of such intervals. In the case of linear fractional functions we use a different approach, based on some results of additive combinatorics due to Bourgain, that gives a nontrivial lower bound for essentially any admissible value of N.

Keywords

dynamical systemsorbitsexponential sumsadditive combinatorics

MSC classification

Secondary: 11A07: Congruences; primitive roots; residue systems 37A45: Relations with number theory and harmonic analysis 37P05: Polynomial and rational maps
Type
Research Article
Information
Bulletin of the Australian Mathematical Society , Volume 82 , Issue 2 , October 2010 , pp. 232 - 239
Copyright
Copyright © Australian Mathematical Publishing Association Inc. 2010

Footnotes

During the preparation of this paper, the first author was supported in part by Spain Ministry of Education and Science Grant MTM2007-67088 and the second author by the Australian Research Council Grant DP0556431.

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