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