Nonequilibrium statistical mechanics Brussels–Austin style

Abstract The fundamental problem on which Ilya Prigogine and the Brussels–Austin Group have focused can be stated briefly as follows. Our observations indicate that there is an arrow of time in our experience of the world (e.g., decay of unstable radioactive atoms like uranium, or the mixing of cream in coffee). Most of the fundamental equations of physics are time reversible, however, presenting an apparent conflict between our theoretical descriptions and experimental observations. Many have thought that the observed arrow of time was either an artifact of our observations or due to very special initial conditions. An alternative approach, followed by the Brussels–Austin Group, is to consider the observed direction of time to be a basic physical phenomenon due to the dynamics of physical systems. This essay focuses mainly on recent developments in the Brussels–Austin Group after the mid-1980s. The fundamental concerns are the same as in their earlier approaches (subdynamics, similarity transformations), but the contemporary approach utilizes rigged Hilbert space (whereas the older approaches used Hilbert space). While the emphasis on nonequilibrium statistical mechanics remains the same, their more recent approach addresses the physical features of large Poincare systems, nonlinear dynamics and the mathematical tools necessary to analyze them.

[1]  Arrow of Time in Rigged Hilbert Space Quantum Mechanics , 2004, quant-ph/0506184.

[2]  C. George Subdynamics and correlations , 1973 .

[3]  I. Prigogine,et al.  Poincaré resonances and the limits of trajectory dynamics. , 1993, Proceedings of the National Academy of Sciences of the United States of America.

[4]  Ioannis Antoniou,et al.  Generalized spectral decomposition of the β-adic baker's transformation and intrinsic irreversibility , 1992 .

[5]  Arno R Bohm,et al.  Resonance poles and Gamow vectors in the rigged Hilbert space formulation of quantum mechanics , 1981 .

[6]  I. Prigogine,et al.  Dynamical and statistical descriptions of N-body systems , 1969 .

[7]  A. Böhm Rigged Hilbert space and mathematical description of physical systems , 1967 .

[8]  I. Prigogine,et al.  Quantum chaos, complex spectral representations and time symmetry breaking , 1994 .

[9]  Hasegawa,et al.  Unitarity and irreversibility in chaotic systems. , 1992, Physical review. A, Atomic, molecular, and optical physics.

[10]  On the construction of state spaces for classical dynamical systems with a time‐dependent Hamilton function , 1984 .

[11]  I. Prigogine,et al.  Irreversibility and nonlocality , 1983 .

[12]  I Prigogine,et al.  From deterministic dynamics to probabilistic descriptions. , 1979, Proceedings of the National Academy of Sciences of the United States of America.

[13]  H. Atmanspacher,et al.  Extrinsic and Intrinsic Irreversibility in Probabilistic Dynamical Laws , 2001 .

[14]  I. Prigogine,et al.  A unified formulation of dynamics and thermodynamics , 1973 .

[15]  J. Bricmont SCIENCE OF CHAOS OR CHAOS IN SCIENCE? , 1995, chao-dyn/9603009.

[16]  K. Gustafson,et al.  From probabilistic descriptions to deterministic dynamics , 1993 .

[17]  Raymond J. Seeger,et al.  Lectures in Theoretical Physics , 1962 .

[18]  Ioannis Antoniou,et al.  Spectral decomposition of the Renyi map , 1993 .

[19]  Hans Primas,et al.  Hidden Determinism, Probability, and Time's Arrow , 2002 .

[20]  I. Prigogine,et al.  Statistical mechanics of irreversible processes Part VIII: general theory of weakly coupled systems , 1956 .

[21]  Rigged Hilbert Spaces associated with Misra-Prigogine-Courbage Theory of Irreversibility , 1998, math-ph/0006014.

[22]  I. Prigogine,et al.  Poincaré resonances and the extension of classical dynamics , 1996 .

[23]  Quantum Time Arrows, Semigroups and Time-Reversal in Scattering , 2002, quant-ph/0210058.

[24]  V. Karakostas On the Brussels School's Arrow of Time in Quantum Theory , 1996, Philosophy of Science.

[25]  B. O. Koopman,et al.  Dynamical Systems of Continuous Spectra. , 1932, Proceedings of the National Academy of Sciences of the United States of America.

[26]  I. Prigogine,et al.  The extension of classical dynamics for unstable Hamiltonian systems , 1997 .

[27]  I. Prigogine,et al.  Irreversible processes in gases I. The diagram technique , 1959 .

[28]  J. Dougherty Explaining statistical mechanics , 1993 .

[29]  I. Antoniou,et al.  Nonlocality of the Misra-Prigogine-Courbage semigroup , 1994 .

[30]  Manuel Gadella,et al.  Dirac Kets, Gamow Vectors and Gel'fand triplets : the rigged Hilbert space formulation of quantum mechanics : lectures in mathematical physics at the University of Texas at Austin , 1989 .

[31]  Ioannis Antoniou,et al.  Intrinsic irreversibility and integrability of dynamics , 1993 .

[32]  Robert C. Hilborn,et al.  Chaos And Nonlinear Dynamics: An Introduction for Scientists and Engineers , 1994 .

[33]  G. Braunss Intrinsic stochasticity of dynamical systems , 1985 .

[34]  Integrability and chaos in classical and quantum mechanics , 1991 .

[35]  K. Gustafson,et al.  On converse to Koopman's Lemma , 1980 .

[36]  Robert W. Batterman,et al.  Randomness and Probability in Dynamical Theories: On the Proposals of the Prigogine School , 1991, Philosophy of Science.

[37]  S. Goldstein,et al.  On intrinsic randomness of dynamical systems , 1981 .

[38]  I. Prigogine,et al.  Intrinsic randomness and intrinsic irreversibility in classical dynamical systems. , 1983, Proceedings of the National Academy of Sciences of the United States of America.

[39]  B. O. Koopman,et al.  Hamiltonian Systems and Transformation in Hilbert Space. , 1931, Proceedings of the National Academy of Sciences of the United States of America.

[40]  B. Misra,et al.  Nonequilibrium entropy, Lyapounov variables, and ergodic properties of classical systems. , 1978, Proceedings of the National Academy of Sciences of the United States of America.

[41]  Tomio Petrosky,et al.  Quantum theory of non-integrable systems , 1991 .

[42]  I. Antoniou,et al.  From stochastic semigroups to chaotic dynamics , 1998 .

[43]  I. Prigogine,et al.  Irreversible processes in gases. III Inhomogeneous systems , 1960 .

[44]  E. Brändas,et al.  Analysis of Prigogine's theory of subdynamics , 1983 .