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Dynamical Systems and Statistical Mechanics
Edited by: Ya. G. Sinaĭ
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Advances in Soviet Mathematics
1991; 254 pp; hardcover
Volume: 3
ISBN-10: 0-8218-4102-5
ISBN-13: 978-0-8218-4102-0
List Price: US$170 Member Price: US$136

Dynamical systems and statistical mechanics have been developing in close interaction during the past decade, and the papers in this book attest to the productiveness of this interaction.

The first paper in the collection contains a new result in the theory of quantum chaos, a burgeoning line of inquiry that combines mathematics and physics and is likely in time to produce many new connections and applications. Another paper, related to the renormalization group method for the study of maps of the circle with singularities due to a jump in the derivative, demonstrates that the fixed point of the renormgroup can be sufficiently described in this case. In certain situations, the renormgroup methods work better than the traditional KAM method.

Other topics covered include thermodynamic formalism for certain infinite-dimensional dynamical systems, numerical simulation of dynamical systems with hyperbolic behavior, periodic points of holomorphic maps, the theory of random media, statistical properties of the leading eigenvalue in matrix ensembles of large dimension, spectral properties of the one-dimensional Schrödinger operator. This volume will appeal to many readers, as it covers a broad range of topics and presents a view of the some of the frontier research in the Soviet Union today.

• V. L. Girko -- $$G$$-consistent estimates of eigenvalues and eigenvectors of matrices