Acta mathematica scientia,Series B ›› 2018, Vol. 38 ›› Issue (2): 591-609.doi: 10.1016/S0252-9602(18)30768-9

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EQUI-ATTRACTION AND BACKWARD COMPACTNESS OF PULLBACK ATTRACTORS FOR POINT-DISSIPATIVE GINZBURG-LANDAU EQUATIONS

Yangrong LI1, Lianbing SHE1,2, Jinyan YIN3   

  1. 1. School of Mathematics and Statistics, Southwest University, Chongqing 400715, China;
    2. Department of Mathematics, Liupanshui normal college, Liupanshui 553004, China;
    3. School of Mathematics and Information, China West Normal University, Nanchong 637002, China
  • Received:2016-09-30 Revised:2017-08-04 Online:2018-04-25 Published:2018-04-25
  • Supported by:

    Y. Li is supported by the National Natural Science Foundation of China (11571283) and L. She is supported by Natural Science Foundation of Guizhou Province (KY[2016]103).

Abstract:

A new concept of an equi-attractor is introduced, and defined by the minimal compact set that attracts bounded sets uniformly in the past, for a non-autonomous dynamical system. It is shown that the compact equi-attraction implies the backward compactness of a pullback attractor. Also, an eventually equi-continuous and strongly bounded process has an equi-attractor if and only if it is strongly point dissipative and strongly asymptotically compact. Those results primely strengthen the known existence result of a backward bounded pullback attractor in the literature. Finally, the theoretical criteria are applied to prove the existence of both equi-attractor and backward compact attractor for a Ginzburg-Landau equation with some varying coefficients and a backward tempered external force.

Key words: Non-autonomous systems, point dissipative processes, pullback attractors, backward compact attractors, equi-attractors, Ginzburg-Landau equations

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