Silverman's conjecture for additive polynomial mappings
Number Theory
2015-11-13 v1
Abstract
Let be an additive polynomial mapping over a global function field , and let . Following Silverman, consider the dynamic degree of and the arithmetic degree of at . We have , and extending a conjecture of Silverman from the number field case, it is expected that equality holds if the orbit of is Zariski-dense. We prove a weaker form of this conjecture: if and the orbit of is Zariski-dense, then also . We obtain furthermore a more precise result concerning the growth along the orbit of of the heights of the individual coordinates, and formulate a few related open problems motivated by our results, including a generalization "with moving targets" of Faltings's theorem back in the number field case.
Cite
@article{arxiv.1511.04061,
title = {Silverman's conjecture for additive polynomial mappings},
author = {Vesselin Dimitrov},
journal= {arXiv preprint arXiv:1511.04061},
year = {2015}
}