English

The Dynamical Mordell-Lang Conjecture

Number Theory 2009-02-06 v2 Algebraic Geometry Dynamical Systems

Abstract

We prove a special case of a dynamical analogue of the classical Mordell-Lang conjecture. In particular, let ϕ\phi be a rational function with no superattracting periodic points other than exceptional points. If the coefficients of ϕ\phi are algebraic, we show that the orbit of a point outside the union of proper preperiodic subvarieties of (\bP1)g(\bP^1)^g has only finite intersection with any curve contained in (\bP1)g(\bP^1)^g. We also show that our result holds for indecomposable polynomials ϕ\phi with coefficients in \bC\bC. Our proof uses results from pp-adic dynamics together with an integrality argument. The extension to polynomials defined over \bC\bC uses the method of specializations coupled with some new results of Medvedev and Scanlon for describing the periodic plane curves under the action of (ϕ,ϕ)(\phi,\phi) on \bA2\bA^2.

Keywords

Cite

@article{arxiv.0712.2344,
  title  = {The Dynamical Mordell-Lang Conjecture},
  author = {Robert L. Benedetto and Dragos Ghioca and Par Kurlberg and Thomas J. Tucker},
  journal= {arXiv preprint arXiv:0712.2344},
  year   = {2009}
}

Comments

25 pages. Results strengthened to include the case of indecomposable polynomials with complex coefficients (using some recent results of Medvedev and Scanlon.)

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