In this paper, we consider the Markov process (X^∈(t), Z^∈(t)) corresponding to a weakly coupled elliptic PDE system with a small parameter ∈ 〉 0. We first prove that (X^∈(t), Z^∈(t)) has the Feller ...In this paper, we consider the Markov process (X^∈(t), Z^∈(t)) corresponding to a weakly coupled elliptic PDE system with a small parameter ∈ 〉 0. We first prove that (X^∈(t), Z^∈(t)) has the Feller continuity by the coupling method, and then prove that (X^∈(t), Z^∈(t)) has an invariant measure μ^∈(·) by the Foster-Lyapunov inequality. Finally, we establish a large deviations principle for μ^∈(·) as the small parameter e tends to zero.展开更多
基金the National Natural Science Foundation of China, Grant No. 19901001
文摘In this paper, we consider the Markov process (X^∈(t), Z^∈(t)) corresponding to a weakly coupled elliptic PDE system with a small parameter ∈ 〉 0. We first prove that (X^∈(t), Z^∈(t)) has the Feller continuity by the coupling method, and then prove that (X^∈(t), Z^∈(t)) has an invariant measure μ^∈(·) by the Foster-Lyapunov inequality. Finally, we establish a large deviations principle for μ^∈(·) as the small parameter e tends to zero.
