Arithmetic properties of families of plane polynomial automorphisms
Abstract
Given an algebraic family f× A2 × A2 of plane polynomial automorphisms of H\'enon type parameterized by a quasi-projective curve, defined over a number field K, we investigate certain arithmetic properties of periodic points contained in a family of subvarieties X ⊂ × A2 . First, consider X as a curve. We prove that the set of parameters t∈(Q), such that Xt is periodic, has bounded height. This generalizes a result of Patrick Ingram. Moreover, if X is non-periodic, then under some mild conditions -- such as when the family is dissipative -- we show that there are, in fact, only finitely many periodic parameters. This extends a result of Charles Favre and Romain Dujardin. Second, let X be a family of curves. Assuming X is non-degenerate, we establish a uniform bound on the number of periodic points in each curve Xt, t∈ (Q) and show that the set of these periodic points have bounded height in × A2 as well. We then examine in more detail the non-degeneracy property in the case of dissipative families of quadratic H\'enon maps.
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