English

Non-autonomous parabolic implosion

Dynamical Systems 2026-03-31 v1 Complex Variables

Abstract

We study parabolic implosion in a general non-autonomous setting. Let f(w)=w+w2+O(w3)f(w)=w+w^2+O(w^3) be a holomorphic germ tangent to the identity. We consider the iteration of non-autonomous perturbations of the form wj+1=f(wj)+εj,n2. w_{j+1}=f(w_j)+\varepsilon_{j,n}^2. We show that, when the εj,n2\varepsilon_{j,n}^2's satisfy a Lavaurs-type condition, the element wnw_n can be described by means of a suitable Lavaurs map LunL_{u_n}, whose phase unu_n is an explicit function of the perturbation parameters. In particular, whenever unuCu_n\to u\in \mathbb C, the non-autonomous dynamics converges locally uniformly on compact subsets of the parabolic basin to the corresponding Lavaurs map LuL_u. Our study provides a general description of additive non-autonomous parabolic implosion and yields several deterministic and random convergence results as corollaries, as well as a unified proof of several previous results. As an application, we also obtain strong discontinuity results for the Julia sets of fibered holomorphic endomorphisms of P2(C)\mathbb P^2(\mathbb C).

Keywords

Cite

@article{arxiv.2603.27686,
  title  = {Non-autonomous parabolic implosion},
  author = {Matthieu Astorg and Fabrizio Bianchi},
  journal= {arXiv preprint arXiv:2603.27686},
  year   = {2026}
}
R2 v1 2026-07-01T11:42:53.452Z