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2009, Volume 24Issue 3: 855-882. Doi: 10.3934/dcds.2009.24.855
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Pullback attractors for nonautonomous and random parabolic equations on non-smooth domains

  • 1.

    Department of Mathematics, National University of Defense Technology, Changsha, 410073

  • 2.

    Department of Mathematics, Auburn University, AL 36849-5310

Received:  November 30, 2007
Revised:  March 31, 2008
Published:  August 2009
Abstract Related Papers Cited by
    Abstract
  • The current paper is devoted to the study of pullback attractors for general nonautonomous and random parabolic equations on non-smooth domains $D$. Mild solutions are considered for such equations. We first extend various fundamental properties for solutions of smooth parabolic equations on smooth domains to solutions of general parabolic equations on non-smooth domains, including continuous dependence on parameters, monotonicity, and compactness, which are of great importance in their own. Under certain dissipative conditions on the nonlinear terms, we prove that mild solutions with initial conditions in $L_q(D)$ exist globally for $q$ » $1$. We then show that pullback attractors for nonautonomous and random parabolic equations on non-smooth domains exist in $L_q(D)$ for $1$ « $q$ < $\infty$.
    Mathematics Subject Classification: 35B41, 35K55, 35R60, 37H10, 37L30, 37L55.

    Citation:
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