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Theses

Dimensions et régularité directionnelles du courant de Green

Abstract : This thesis studies the dynamical properties of holomorphic endomorphisms of the complex projective plane. The first part introduces and proves lower bounds for the directional dimensions of the Green current. We give there a multifractal analysis of the slices of that current by local coordinates, with respect to dilating ergodic measures. A first application shows that, with respect to every measure of large entropy, every closed positive current has a directional dimension strictly larger than two, which answers a question by de Thélin and Vigny. A second application describes the directional dimensions of the Green current of Dujardin's semi-extremal endomorphisms, which have an equilibrium measure absolutely continuous with respect to the trace measure of the Green current. The second part provides upper bounds for the directional dimensions of the Green current by using Pluripotential Theory. Combining these results with those of the first part, we obtain a separation property of the directional dimensions of the Green current with respect to the equilibrium measure. In the last part, we focus on the regularity of one-dimensional slices of the Green current in two semi-extremal situations. We show that the Radon-Nikodym derivative of the stable slices is bounded almost everywhere. This property is close to the absolute continuity with respect to the Lebesgue measure, and specifies our previous results. Our methods also allow to prove an upper bound for the local dimension of dilating ergodic measures, which is a new step towards Binder-DeMarco's conjecture concerning the dimension of the equilibrium measure.
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Axel Rogue. Dimensions et régularité directionnelles du courant de Green. Systèmes dynamiques [math.DS]. Université Rennes 1, 2017. Français. ⟨NNT : 2017REN1S118⟩. ⟨tel-01792725⟩

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