Raluca Tanase


Institute of Mathematics
of the Romanian Academy



office: Room 403
e-mail: raluca.tanase@imar.ro

Raluca Tanase

Some of my papers:

M. Lyubich, R. Radu, R. Tanase, Hedgehogs in higher dimensions and their applications, Astérisque 416 (2020), p. 213-251 arXiv:1611.09840. hide/see abstract.

In this paper we study the dynamics of germs of holomorphic diffeomorphisms of $(\mathbb{C}^{n},0)$ with a fixed point at the origin with exactly one neutral eigenvalue. We prove that the map on any local center manifold of $0$ is quasiconformally conjugate to a holomorphic map and use this to transport results from one complex dimension to higher dimensions.

T. Firsova, M. Lyubich, R. Radu, R. Tanase, Hedgehogs for neutral dissipative germs of holomorphic diffeomorphisms of $(\mathbb{C}^2,0)$, Astérisque 416 (2020), p. 193-211. arXiv:1611.09342. hide/see abstract.

We prove the existence of hedgehogs for germs of complex analytic diffeomorphisms of $(\mathbb{C}^{2},0)$ with a semi-neutral fixed point at the origin, using topological techniques. This approach also provides an alternative proof of a theorem of Pérez-Marco on the existence of hedgehogs for germs of univalent holomorphic maps of $(\mathbb{C},0)$ with a neutral fixed point.

R. Radu, R. Tanase, A structure theorem for semi-parabolic Hénon maps, Advances in Mathematics 350 (2019) 1000-1058. arXiv:1411.3824. hide/see abstract.

Consider the parameter space $\mathcal{P}_{\lambda}\subset \mathbb{C}^{2}$ of complex Hénon maps $$ H_{c,a}(x,y)=(x^{2}+c+ay,ax),\ \ a\neq 0 $$ which have a semi-parabolic fixed point with one eigenvalue $\lambda=e^{2\pi i p/q}$. We give a characterization of those Hénon maps from the curve $\mathcal{P}_{\lambda}$ that are small perturbations of a quadratic polynomial $p$ with a parabolic fixed point of multiplier $\lambda$. We prove that there is an open disk of parameters in $\mathcal{P}_{\lambda}$ for which the semi-parabolic Hénon map has connected Julia set $J$ and is structurally stable on $J$ and $J^{+}$. The Julia set $J^{+}$ has a nice local description: inside a bidisk $\mathbb{D}_{r}\times \mathbb{D}_{r}$ it is a trivial fiber bundle over $J_{p}$, the Julia set of the polynomial $p$, with fibers biholomorphic to $\mathbb{D}_{r}$. The Julia set $J$ is homeomorphic to a quotiented solenoid.

R. Radu, R. Tanase, Semi-parabolic tools for hyperbolic Hénon maps and continuity of Julia sets in $\mathbb{C}^2$,
Trans. Amer. Math. Soc. 370 (2018), 3949-3996. arXiv:1508.03625. hide/see abstract.

We prove some new continuity results for the Julia sets $J$ and $J^{+}$ of the complex Hénon map $H_{c,a}(x,y)=(x^{2}+c+ay, ax)$, where $a$ and $c$ are complex parameters. We look at the parameter space of strongly dissipative Hénon maps which have a fixed point with one eigenvalue $(1+t)\lambda$, where $\lambda$ is a root of unity and $t$ is real and small in absolute value. These maps have a semi-parabolic fixed point when $t$ is $0$, and we use the techniques that we have developed in [RT] for the semi-parabolic case to describe nearby perturbations. We show that for small nonzero $|t|$, the Hénon map is hyperbolic and has connected Julia set. We prove that the Julia sets $J$ and $J^{+}$ depend continuously on the parameters as $t\rightarrow 0$, which is a two-dimensional analogue of radial convergence from one-dimensional dynamics. Moreover, we prove that this family of Hénon maps is stable on $J$ and $J^{+}$ when $t$ is nonnegative.

S. Bonnot, R. Radu, R. Tanase, Hénon maps with biholomorphic escaping sets, Complex Dynamics and its Synergies (2017) 3:3, doi.org/10.1186/s40627-017-0010-9. hide/see abstract.

For any complex Hénon map \(H_{p,a}=(p(x)-ay,x)\), the universal cover of the forward escaping set \(U^+\) is biholomorphic to \((\mathbb{C}-\overline{\mathbb{D}})\times\mathbb{C})\), where \(\mathbb{D}\) is the unit disk. The vertical foliation by copies of \(\mathbb{C}\) descends to the escaping set itself and makes it a rather rigid object. In this note, we give evidence of this rigidity by showing that the analytic structure of the escaping set essentially characterizes the Hénon map, up to some ambiguity which increases with the degree of the polynomial \(p\).

R. Radu, R. Tanase, A new proof of a theorem of Hubbard & Oberste-Vorth, Fixed Point Theory and Applications,
(2016) 2016:43. arXiv:1511.03256. hide/see abstract.

We give a new proof of a theorem of Hubbard-Oberste-Vorth for Hénon maps that are perturbations of a hyperbolic polynomial and recover the Julia set $J^{+}$ inside a polydisk as the image of the fixed point of a contracting operator. We also give a different characterization of the Julia set $J^{+}$ that proves useful for later applications.

R. Tanase, Complex Hénon maps and discrete groups, Advances in Mathematics 295, 53-89 (2016).
arXiv:1503.03665. hide/see abstract.

Consider the standard family of complex Hénon maps \(H(x,y)=(p(x)-ay,x)\), where \(p\) is a quadratic polynomial and \(a\) is a complex parameter. Let \(U^+\) be the set of points that escape to infinity under forward iterations. The analytic structure of the escaping set \(U^+\) is well understood from previous work of J. Hubbard and R. Oberste-Vorth as a quotient of \((\mathbb{C}-\overline{\mathbb{D}})\times\mathbb{C})\) by a discrete group of automorphisms \(\Gamma\) isomorphic to \( \mathbb{Z}[1/2]/\mathbb{Z} \). On the other hand, the boundary \(J^+\) of \(U^+\) is a complicated fractal object on which the Hénon map behaves chaotically. We show how to extend the group action to \(\mathbb{S}^1\times\mathbb{C}\), in order to represent the set \(J^+\) as a quotient of \(\mathbb{S}^1\times\mathbb{C}/\Gamma\) by an equivalence relation. We analyze this extension for Hénon maps that are small perturbations of hyperbolic polynomials with connected Julia sets or polynomials with a parabolic fixed point.

T. Firsova, R. Radu, R. Tanase, Critical Locus in an HOV Region, preprint 2022. hide/see abstract.

We prove that the characterization of the critical locus for complex Henon maps that are small perturbations of quadratic polynomials with disconnected Julia set given by the first author holds in a much larger HOV-like region from the horseshoe locus. The techniques of this paper are not perturbative.

Thesis

R. Tanase, Hénon maps, discrete groups and continuity of Julia sets, Cornell University, 2013. (available here)

Last updated December 2021