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Chernov, Nikolai - Department of Mathematics, University of Alabama at Birmingham
Brownian Brownian Motion I N. Chernov1
Sinai billiards under small external forces II N. Chernov1
Particle's drift in self-similar billiards N. Chernov1
Dynamical Borel-Cantelli lemmas for Gibbs measures and D. Kleinbock
Conditionally invariant measures for Anosov maps with small holes
,,Global and local... fluctuations of phase space contraction in deterministic stationary nonequilibrium
A stretched exponential bound on time correlations for billiard flows
Ergodic properties of Anosov maps with rectangular holes
Hyperbolic billiards and statistical physics Nikolai Chernov and Dmitry Dolgopyat1
Invariant measures for hyperbolic dynamical September 14, 2006
A New Approach to Statistical Efficiency of Weighted Least Squares Fitting Algorithms for
Improved estimates for correlations in billiards N. Chernov1
Statistical Properties of 2-D Generalized Hyperbolic V. S. Afraimovich1
On a slow drift of a massive piston in an ideal gas that remains at mechanical equilibrium
STEADY-STATE ELECTRICAL CONDUCTION IN THE PERIODIC LORENTZ GAS
Entropy Values and Entropy Bounds Department of Mathematics
On Sinai-Bowen-Ruelle measures on horocycles of 3-D Anosov flows
A family of chaotic billiards with variable mixing rates
Nonuniformly hyperbolic K-systems are Bernoulli N.I. Chernov
Galton Board: limit theorems and recurrence N. Chernov1
Scaling Dynamics of a Massive Piston in a Cube Filled With Ideal Gas: Exact Results
Markov approximations and decay of correlations
Upgrading Local Ergodic Theorem for planar semi-dispersing billiards
Derivation of Ohm's Law in a Deterministic Mechanical Model
DIFFUSIVE MOTION AND RECURRENCE ON AN IDEALIZED GALTON BOARD
Regularity of Bunimovich's stadia N. Chernov1
Chaotic Billiards Nikolai Chernov
Dispersing billiards with cusps: slow decay of correlations
On the convergence of fitting algorithms in computer vision
Advanced statistical properties of dispersing N. Chernov1
Regularity of local manifolds in dispersing Department of Mathematics
Billiards with polynomial mixing rates N. Chernov1
Least squares fitting of circles and lines N. Chernov and C. Lesort
http://www.elsevier.com/locate/jco Journal of Complexity ] (]]]]) ]]]]]]
Statistical efficiency of curve fitting algorithms N. Chernov and C. Lesort
Geometry of Multi-dimensional Dispersing Billiards Alfred Renyi Institute of the H.A.S.
Department of Mathematics University of Alabama at Birmingham
Dynamics of a Massive Piston in an Ideal Gas N. Chernov1,4
Dynamics of a Massive Piston in an Ideal Gas: Oscillatory Motion and Approach to Equilibrium
Expanding maps of an interval with holes H. van den Bedem
Introduction to the Ergodic Theory of Chaotic Nikolai Chernov Roberto Markarian
The existence of Burnett coefficients in the periodic Lorentz gas
Invariant measures for Anosov maps with small holes
Decay of correlations and dispersing billiards Department of Mathematics
ULMTP/973 February 1997 (revised version October 1997)
Entropy, Lyapunov exponents and mean free path for Department of Mathematics
Anosov maps with rectangular holes. Nonergodic cases.
Stationary Nonequilibrium States in Boundary Driven Hamiltonian Systems: Shear Flow
Stationary Shear Flow in Boundary Driven Hamiltonian Systems
Limit Theorems and Markov Approximations for Chaotic Dynamical Systems
On Local Ergodicity in Hyperbolic Systems with Singularities
Decay of Correlations for Lorentz Gases and Hard Balls
Ergodicity of Billiards in Polygons with Pockets N. Chernov and S. Troubetzkoy
On statistical properties of chaotic dynamical systems N.I. Chernov
IOP PUBLISHING NONLINEARITY Nonlinearity 20 (2007) 25392549 doi:10.1088/0951-7715/20/11/005
Statistical properties of piecewise smooth hyperbolic systems in high dimensions
STATISTICAL PROPERTIES OF THE PERIODIC LORENTZ GAS. MULTIDIMENSIONAL CASE
Flow-invariant hypersurfaces in semi-dispersing billiards
Sinai billiards under small external forces N.I. Chernov
Stability of Solutions of Hydrodynamic Equations Describing the Scaling Limit of a Massive Piston in an