A. S. Lyapin, “On the Limit Behavior of the Trajectory Attractor of a Nonlinear Hyperbolic Equation Containing a Small Parameter at the Highest Derivative”, Mat. Zametki, 2009, Volume 85, Issue 5,Pages <nobr>745

This article is cited in 1 paper

On the Limit Behavior of the Trajectory Attractor of a Nonlinear Hyperbolic Equation Containing a Small Parameter at the Highest Derivative

A. S. Lyapin

Moscow State Aviation Technological University

Abstract: We study the trajectory attractor of a nonlinear nonautonomous hyperbolic equation with dissipation depending on a small parameter. The nonlinear function appearing in this equation does not satisfy the Lipschitz condition. It is shown that, as the small parameter tends to zero, the trajectory attractor of the hyperbolic equation converges to the trajectory attractor of the limit parabolic equation in the corresponding topology.

Keywords: nonlinear hyperbolic equation, trajectory attractor, dissipation, Lipschitz condition, Cauchy problem, translation compactness, attracting set.

UDC: 517.928.4

Received: 22.08.2008

DOI: 10.4213/mzm6911