Abstract
Stochastic processes and dynamical systems in measure spaces are defined as classes of random variables in the Doob sense. Markov processes which are ergodic into a “strong” sense are shown to be suitable models for the thermodynamic irreversibility. These processes are also isomorphic, in the Doob sense, with bernoulli dynamical systems defined into the spaces of trajectories. In this approach, we show that the Misra-Prigogine-Courbage theory of irreversibility can be formulated as a change of respresentation of strong ergodic Markov processes. The physically meaning is that all experimentally observed strong ergodic Markov processes can be “lifted” to a unitary “superdynamics”.
Authors
A. Georgescu
Keywords
Cite this paper as:
N. Suciu, A. Georgescu, On the Misra-Prigogine-Courbage theory of irreversibility, Mathematica, 44(67) (2002) 2, pp. 215-231.
References
About this paper
Journal
Mathematica (Cluj)
Publisher Name
Publishing House of the Romanian Academy
(Editura Academiei Romane)
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