VARIATIONAL PRINCIPLE FOR FUZZY GIBBS MEASURESVerbitskiy, E., 2010, In : Moscow mathematical journal. 10, 4, p. 811-829 19 p.
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In this paper we study a large class of renormalization transformations of measures on lattices. An image of a Gibbs measure under such transformation is called a fuzzy Gibbs measure. Transformations of this type and fuzzy Gibbs measures appear naturally in many fields. Examples include the hidden Markov processes (HMP), memory-less channels in information theory, continuous block factors of symbolic dynamical systems, and many renormalization transformations of statistical mechanics. The main result is the generalization of the classical variational principle of Dobrushin-Lanford-Ruelle for Gibbs measures to the class of fuzzy Gibbs measures.
|Number of pages||19|
|Journal||Moscow mathematical journal|
|Publication status||Published - 2010|
- Non-Gibbsian measures, renormalization, deterministic and random transformations, variational principle, TO-ONE CODES, TRANSFORMATIONS, PROJECTIONS, ENTROPY, STATES, MODEL