Topology of Fatou components for endomorphisms of CP^k: linking with the Green's current

Abstract: Little is known about the global topology of the Fatou set U (f) for holomorphic endomorphisms f : CP k → CP k , when k > 1. Classical theory describes U (f) as the complement in CP k of the support of a dynamically defined closed positive (1, 1) current. Given any closed positive (1, 1) current S on CP k , we give a definition of linking number between closed loops in CP k \ supp S and the current S. It has the property that if lk(γ, S) = 0, then γ represents a non-trivial homology element in H1(CP k \ supp S… Show more

“…Let {ε n } n∈N be a real sequence verifying ε n < (2n) ν (10) for some ν > 0. Let us define the sequence ϑ 1 , ϑ 2 , .…”

“…In recent years, special interest has been given to skew-product dynamical systems, and many results about complex skew-product dynamics have appeared (see [4,10,11,17,19,20]). On the one hand, skew-product dynamics presents a rich source of examples, and on the other hand, it is considered as an intermediate step towards higher-dimensional dynamics.…”

Towards a semi-local study of parabolic invariant curves for fibered holomorphic maps

“…Let {ε n } n∈N be a real sequence verifying ε n < (2n) ν (10) for some ν > 0. Let us define the sequence ϑ 1 , ϑ 2 , .…”

“…In recent years, special interest has been given to skew-product dynamical systems, and many results about complex skew-product dynamics have appeared (see [4,10,11,17,19,20]). On the one hand, skew-product dynamics presents a rich source of examples, and on the other hand, it is considered as an intermediate step towards higher-dimensional dynamics.…”

Towards a semi-local study of parabolic invariant curves for fibered holomorphic maps

“…Let Ω n := {x : R −n {x} ⊆ Ω 0 } and C n be the critical value set for R n . For x ∈ Ω n \ C n , we may define (16) ϕ…”

“…This is described more precisely at the beginning of §2. Although this is a rather special situation, it has appeared in examples from [31,16,6,5]. For such maps, the Julia set of f |L is an invariant circle S, which is a hyperbolic set for f .…”

Superstable manifolds of invariant circles and codimension-one Böttcher functions

“…For this reason, polynomial skew products provide an accessible generalization of one variable dynamics to two variables. They been previously studied by many authors, including Heinemann in [6, 7], Jonsson in [12], DeMarco-Hruska in [2], and Hruska together with the author of this note in [8].A more general situation in which the base is allowed to be an arbitrary compact topological space, while the vertical fibers are copies of C, has been considered by Sester in [17,18]. Meanwhile, generalization to semigroups of polynomial (and rational) mappings of the Riemann sphere has been studied by extensively by Hinkkanen, Martin, Ren, Stankewitz, Sumi, Urbański, and many others-we refer the reader to the excellent bibliography from [21] for further references.As an analogy with polynomial maps of one variable,Here, J p is the Julia set for the "base map" z → p(z).…”

A dichotomy for Fatou components of polynomial skew products