P. Berger and R. Dujardin, On stability and hyperbolicity for polynomial automorphisms of C^2, Annales scientifiques de l'??cole normale sup??rieure, vol.50, issue.2, pp.449-477, 2017.
DOI : 10.24033/asens.2324
URL : https://hal.archives-ouvertes.fr/hal-01068578

E. ;. Bedford and J. Smillie, Polynomial diffeomorphisms of C2: currents, equilibrium measure and hyperbolicity, Inventiones Mathematicae, vol.36, issue.1, pp.69-99, 1991.
DOI : 10.1007/BF01239509

E. ;. Bedford and J. Smillie, Polynomial Diffeomorphisms of C 2 . II: Stable Manifolds and Recurrence, Journal of the American Mathematical Society, vol.4, issue.4
DOI : 10.2307/2939284

J. Amer, Math. Soc, vol.4, pp.657-679, 1991.

E. ;. Bedford and J. Smillie, Polynomial diffeomorphisms ofC 2, Mathematische Annalen, vol.2, issue.1, pp.395-420, 1992.
DOI : 10.1007/978-1-4612-5775-2

E. ;. Bedford, . Lyubich, . Mikhail, and J. Smillie, Polynomial diffeomorphisms ofC 2. IV: The measure of maximal entropy and laminar currents, Inventiones Mathematicae, vol.2, issue.67, pp.77-125, 1993.
DOI : 10.1007/BF01232426

E. ;. Bedford and J. Smillie, Polynomial diffeomorphisms of C 2, VI. Connectivity of J. Ann. of Math, issue.2, pp.148-695, 1998.

. Bhi, . Buzzard, T. Gregery, S. Hruska, and . Lynch, Ilyashenko, Yulij. Kupka-Smale theorem for polynomial automorphisms of C 2 and persistence of heteroclinic intersections, Invent. Math, vol.161, pp.45-89, 2005.

. Bj, . Buzzard, T. Gregery, and A. Jenkins, Holomorphic motions and structural stability for polynomial automorphisms of C 2, Indiana Univ. Math. J, vol.57, pp.277-308, 2008.

J. L. Doob, Classical potential theory and its probabilistic counterpart. Reprint of the 1984 edition, Classics in Mathematics, 2001.

R. Dujardin, Some remarks on the connectivity of Julia sets for 2-dimensional diffeomorphisms, Complex DynamicsDu2] Dujardin, Romain. A closing lemma for polynomial automorphisms of C 2, pp.63-84, 2006.
DOI : 10.1090/conm/396/07394

R. ;. Dujardin, M. Lyubich, J. Fornaess, and . Erik, Stability and bifurcations for dissipative polynomial automorphisms of $${{\mathbb {C}}^2}$$ C 2, Inventiones mathematicae, vol.31, issue.3, pp.439-511, 2006.
DOI : 10.1090/S0002-9939-1989-0977924-5

J. Fornaess and . Erik, Sibony, Nessim Complex Hénon mappings in C 2 and Fatou-Bieberbach domains. Duke Math, J, vol.65, pp.345-380, 1992.

. Fm-]-friedland and J. Milnor, Dynamical properties of plane polynomial automorphisms, Ergodic Theory and Dynamical Systems, vol.25, issue.01, pp.67-99, 1989.
DOI : 10.1016/0022-4049(86)90044-7

L. Guerini and H. Peters, Julia sets of complex H??non maps, International Journal of Mathematics, vol.9, issue.1
DOI : 10.1007/s00039-014-0280-9

Y. Ishii, Dynamics of Polynomial Diffeomorphisms of $$\mathbb {C}^2$$ C 2 : Combinatorial and Topological Aspects, Arnold Mathematical Journal, vol.12, issue.7, pp.119-173, 2017.
DOI : 10.1109/31.1825

. Lyubich, . Mikhail, and H. Peters, Structure of partially hyperbolic Hénon maps Preprint arxiv:1712.05823. [S] S lodkowski, Zbigniew. Holomorphic motions and polynomial hulls, Proc. Amer, pp.347-355, 1991.

J. Yoccoz, Introduction to hyperbolic dynamics. Real and complex dynamical systems, NATO Adv. Sci. Inst. Ser. C Math. Phys. Sci, vol.464, pp.265-291, 1993.

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