Self-Similar Fractals and Arithmetic Dynamics
Abstract
The concept of self-similarity on subsets of algebraic varieties is defined by considering algebraic endomorphisms of the variety as `similarity' maps. Self-similar fractals are subsets of algebraic varieties which can be written as a finite and disjoint union of `similar' copies. Fractals provide a framework in which, one can unite some results and conjectures in Diophantine geometry. We define a well-behaved notion of dimension for self-similar fractals. We also prove a fractal version of Roth's theorem for algebraic points on a variety approximated by elements of a fractal subset. As a consequence, we get a fractal version of Siegel's theorem on finiteness of integral points on hyperbolic curves and a fractal version of Falting's theorem on Diophantine approximation on abelian varieties.
Cite
@article{arxiv.math/0404498,
title = {Self-Similar Fractals and Arithmetic Dynamics},
author = {Arash Rastegar},
journal= {arXiv preprint arXiv:math/0404498},
year = {2015}
}
Comments
19 pages