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Creators/Authors contains: "Nándori, Péter"

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  1. ; (, Advances in Mathematics)
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  2. ; ; ; (, Inventiones mathematicae)
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  3. ; ; (, Annales de l'Institut Henri Poincaré, Probabilités et Statistiques)
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  4. ; (, Discrete and Continuous Dynamical Systems)
    We consider dispersing billiard tables whose boundary is piecewise smooth and the free flight function is unbounded. We also assume there are no cusps. Such billiard tables are called type D in the monograph of Chernov and Markarian [9]. For a class of non-degenerate type D dispersing billiards, we prove exponential decay of correlation and several other statistical properties. 
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  5. ; (, Nonlinearity)
    Abstract Particles are injected into a large planar domain through the boundary and perform a random or sufficiently chaotic deterministic motion inside the domain. Our main example is the Sinai billiard, which periodically extended to our large planar domain, is referred to as the Lorentz process. Assuming that the particles move independently from one another and the boundary is also absorbing, we prove the emergence of local equilibrium of the particle density in the diffusive scaling limit in two scenarios. One scenario is an arbitrary domain with piece-wise smooth boundary and a carefully chosen injection rule; the other scenario is a rectangular domain and a much more general injection mechanism. We study the latter scenario in an abstract framework that includes Lorentz processes and random walks and hopefully allows for more applications in the future. 
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  6. ; (, Ergodic Theory and Dynamical Systems)
    We formulate abstract conditions under which a suspension flow satisfies the local central limit theorem. We check the validity of these conditions for several systems including reward renewal processes, Axiom A flows, as well as the systems admitting Young’s tower, such as Sinai’s billiard with finite horizon, suspensions over Pomeau–Manneville maps, and geometric Lorenz attractors. 
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  7. ; (, Bulletin of the London Mathematical Society)