Random attractors for non-autonomous stochastic plate equations with multiplicative noise and nonlinear damping

“…The theory of attractors for second-order evolution equations was studied and summarized by Chueshov and Lasiecka [1]. Due to the wide applications to the material science, optics, and wave motion, the (second-order) plate PDE (1) (or other forms) has received the attention and research of many scholars; see the case of bounded domains [2][3][4][5][6][7][8][9], the case of unbounded domains [10,11], and the stochastic version [12][13][14].…”

Residually continuous pullback attractors for stochastic discrete plate equations

“…The theory of attractors for second-order evolution equations was studied and summarized by Chueshov and Lasiecka [1]. Due to the wide applications to the material science, optics, and wave motion, the (second-order) plate PDE (1) (or other forms) has received the attention and research of many scholars; see the case of bounded domains [2][3][4][5][6][7][8][9], the case of unbounded domains [10,11], and the stochastic version [12][13][14].…”

Residually continuous pullback attractors for stochastic discrete plate equations

“…For the stochastic case, the existence of random attractors for plate equations has been investigated in [10,11,12] on bounded domains. In addition, there are results about the existence of random attractors and asymptotic compactness for plate equations on unbounded domains in [13][14][15][16][17][18].…”

Asymptotic Behavior of the Kirchhoff Type Stochastic Plate Equation on Unbounded Domains

“…For the stochastic plate equations, if µ = 0 and the forcing term g(x, t) = g(x), then the existence of a random attractor of (1.1)-(1.2) on bounded domain have been proved in [15,16,12,14]; if µ = 0, the existence of random attractors for plate equations with memory and additive white noise on bounded domain were considered in [19,20]. Recently, on the unbounded domain, the authors investigated the asymptotic behavior for stochastic plate equation with additive noise and multiplicative noise (see [33,32,30,31] for details). To the best of our knowledge, it is not considered by any predecessors for the stochastic plate equation with additive noise and memory on unbounded domain.…”

Asymptotic behavior for stochastic plate equations with memory and additive noise on unbounded domains