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OverviewThe papers included here deal with the many faces of renormalization group formalism as it is used in different branches of theoretical physics. The subjects covered emphasize various applications to the theory of turbulence, chaos, quantum chaos in dynamical systems, spin systems and vector models. Also discussed are applications to related topics such as quantum field theory and chromodynamics, high temperature superconductivity and plasma physics. Full Product DetailsAuthor: Dmitri V Shirkov (Jinr, Dubna, Russia) , Viacheslav B Priezzhev (Jinr, Dubna, Russia)Publisher: World Scientific Publishing Co Pte Ltd Imprint: World Scientific Publishing Co Pte Ltd ISBN: 9789810208967ISBN 10: 9810208960 Pages: 372 Publication Date: 01 April 1992 Audience: Professional and scholarly , Professional & Vocational Format: Hardback Publisher's Status: Active Availability: In Print  This item will be ordered in for you from one of our suppliers. Upon receipt, we will promptly dispatch it out to you. For in store availability, please contact us. Table of ContentsRG in Chern-Simons field theories and high-temperature superconductivity, L.V. Avdeev and D.I. Kazakov; the three-loop QED photon vacuum polarization function in the -scheme and the four-loop QED beta-function in the on-shell scheme, S.G. Gorishny et al; method of effective charges and Bordsky-Lepage-MacKenzie criterion, G. Grunberg; critical exponents for Ising-like systems in non-integer dimensions from field theory, Yu Holovatch and M. Shpot; scaling in superconductors - three-loop RG expansions for a three-dimensional model with three coupling constants, S.A. Antonenko and A.I. Sokolov; a renormalization group analysis of frustrated non-collinear magnets, P. Azaria and B. Delamotte; critical properties of the N-vector model near large-scale defects, R.Z. Bariev and I.Z. Ilaldinov; dynamics of the inhomogeneous excitations in the one-dimensional isotropic X-Y model of spin s=1/2, G.O. Berim; the principle of maximum randomness in the theory of fully developed turbulence, L. Ts Adzhemyan and M. Yu Nalimov; chaotic renormalization group transformations, P.H. Damagaard; symmetry breaking bifurcations in chaotic systems, P. Grassberger and A.S. Pikovsky; the renormalization group method based on group analysis, V.F. Kovalev et al.ReviewsAuthor InformationTab Content 6Author Website:Countries AvailableAll regions |
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