Well-posedness and strong attractors for a beam model with degenerate nonlocal strong damping
Abstract
This paper is devoted to initial-boundary value problem of an extensible beam equation with degenerate nonlocal energy damping in ⊂Rn: utt- u+2u-γ( u2+ ut2)q ut+f(u)=0. We prove the global existence and uniqueness of weak solutions, which gives a positive answer to an open question in [24]. Moreover, we establish the existence of a strong attractor for the corresponding weak solution semigroup, where the ``strong" means that the compactness and attractiveness of the attractor are in the topology of a stronger space H1q.
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