Uniform attractor of a non-autonomous Lame thermoelastic system
Abstract
In this paper, we investigate the dynamical behavior of non-autonomous Lame thermoelastic systems within N-dimensional materials. With appropriate constraints on nonlinear characteristics and functional parameters, we initially establish the existence of a uniformly absorbing set by constructing a Lyapunov function. Subsequently, we employ the contraction mapping principle to demonstrate the uniformly asymptotic compactness of the system. Finally, under irrotational conditions, we prove the existence of a uniform attractor A in the space Hc.
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