论文信息 - Geometric ergodicity for stochastic pdes

Geometric ergodicity for stochastic pdes

This paper examines the geometric ergodicity of a semin-linear parabolic PDE forced by a Wiener process on a separable Hilbert space. Under a dissipative assumption on the vector field and a non-degeneracy assumption on the noise, geometric ergodicity is proved with respect to the class of measurable functions bounded by 1+‖·‖2The theorems apply under general conditions on the noise, both additive and multiplicative cases being considered, and apply for instance to a dissipative reaction-diffusion equation on [0,1] with a globally Lipschitz nonlinearity when forced by additive space-time white noise

Tony Shardlow

[1] I. Chueshov. Approximate inertial manifolds of exponential order for semilinear parabolic equations subjected to additive white noise , 1995 .

[2] S. Meyn,et al. Stability of Markovian processes III: Foster–Lyapunov criteria for continuous-time processes , 1993, Advances in Applied Probability.

[3] Tony Shardlow,et al. A Perturbation Theory for Ergodic Markov Chains and Application to Numerical Approximations , 2000, SIAM J. Numer. Anal..

[4] J. Zabczyk,et al. Ergodicity for Infinite Dimensional Systems: Invariant measures for stochastic evolution equations , 1996 .

[5] Richard L. Tweedie,et al. Markov Chains and Stochastic Stability , 1993, Communications and Control Engineering Series.

[6] Igor Chueshov,et al. Inertial manifolds and forms for semilinear parabolic equations subjected to additive white noise , 1995 .

[7] J. Craggs. Applied Mathematical Sciences , 1973 .

[8] Jerzy Zabczyk,et al. Strong Feller Property and Irreducibility for Diffusions on Hilbert Spaces , 1995 .

[9] R. Temam. Infinite Dimensional Dynamical Systems in Mechanics and Physics Springer Verlag , 1993 .