Properties of Global Attractors of Partial Differential Equations
( Advances in Soviet Mathematics )
Publication series : Advances in Soviet Mathematics
Author: A. V. Babin;M. I. Vishik
Publisher: American Mathematical Society
Publication year: 2018
E-ISBN: 9781470445577
P-ISBN(Paperback): 9780821841099
Subject: O1 Mathematics
Keyword: 数学
Language: ENG
Disclaimer: Any content in publications that violate the sovereignty, the constitution or regulations of the PRC is not accepted or approved by CNPIEC.
Properties of Global Attractors of Partial Differential Equations
Description
The four papers in this volume examine attractors of partial differential equations, with a focus on investigation of elements of attractors. Unlike the finite-dimensional case of ordinary differential equations, an element of the attractor of a partial differential equation is itself a function of spatial variables. This dependence on spatial variables is investigated by asymptotic methods. For example, the asymptotics show that the turbulence generated in a tube by a large localized external force does not propagate to infinity along the tube if the flux of the flow is not too large. Another topic considered here is the dependence of attractors on singular perturbations of the equations. The theory of unbounded attractors of equations without bounded attracting sets is also covered. All of the articles are systematic and detailed, furnishing an excellent review of new approaches and techniques developed by the Moscow school.
Chapter