The Dynamical Mordell-Lang Conjecture is an analogue of the classical Mordell-Lang conjecture in the context of arithmetic dynamics. It predicts the behavior of the orbit of a point $x$ under the action of an endomorphism $f$ of a quasiprojective complex variety $X$. More precisely, it claims that for any point $x$ in $X$ and any subvariety $V$ of $X$, the set of indices $n$ such that the $n$-th iterate of $x$ under $f$ lies in $V$ is a finite union of arithmetic progressions. In this book the authors present all known results about the Dynamical Mordell-Lang Conjecture, focusing mainly on a $p$-adic approach which provides a parametrization of the orbit of a point under an endomorphism of a variety.
| ISBN: | 9781470424084 |
| Publication date: | 30th April 2016 |
| Author: | Jason P Bell, Dragos Ghioca, Thomas J Tucker |
| Publisher: | American Mathematical Society |
| Format: | Hardback |
| Pagination: | 280 pages |
| Series: | Mathematical Surveys and Monographs |
| Genres: |
Algebraic geometry Algebra Number theory |