Pathwise upper semi-continuity of random pullback attractors along the time axis

“…We can prove an abstract result that a periodic random attractor is backward compact if and only if it is local compact. A random attractor may not be locally compact (see [10]), although a deterministic attractor is automatically locally compact (see [27]).…”

Backward compactness and periodicity of random attractors for stochastic wave equations with varying coefficients

“…We can prove an abstract result that a periodic random attractor is backward compact if and only if it is local compact. A random attractor may not be locally compact (see [10]), although a deterministic attractor is automatically locally compact (see [27]).…”

Backward compactness and periodicity of random attractors for stochastic wave equations with varying coefficients

“…The existence of a forward controller relates to the forward compactness in Def.1.1, and also the local compactness (see [13,40]), which means ∪ r∈I A r (ω) is pre-compact in X for any compact interval I ⊂ R.…”

“…Suppose Φ has a pullback attractor A = {A t (ω) : t ∈ R, ω ∈ Ω}. This type of attractors seems to be first introduced by Crauel et al [11] and independently by Wang [39] with developments in [1,13,14,26,27,41,44,45]. Only the compactness of the time-component A t was discussed in these papers.…”

Forward controllability of a random attractor for the non-autonomous stochastic sine-Gordon equation on an unbounded domain

“…The first aim in this paper is to establish a random attractor A δ for the problem (1.3)-(1.4). In view of both the non-autonomous and the random nature, the attractor is actually a bi-parametric set formulated by A δ = {A δ (τ , ω)} and called a pullback random attractor, which was first introduced by Crauel et al [8] and by Wang [32] independently, with developments [2,9,10,18,20,26,36,37,42,43,45].…”

Random attractors for Ginzburg–Landau equations driven by difference noise of a Wiener-like process