Well-posedness and dynamics of fractional Fitz Hugh-Nagumo systems on R^(N) driven by nonlinear noise  

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作  者:Renhai Wang Boling Guo Bixiang Wang 

机构地区:[1]Institute of Applied Physics and Computational Mathematics,Beijing 100088,China [2]Department of Mathematics,New Mexico Institute of Mining and Technology,Socorro,NM 87801,USA

出  处:《Science China Mathematics》2021年第11期2395-2436,共42页中国科学:数学(英文版)

基  金:supported by the China Scholarship Council(Grant No.201806990064)。

摘  要:This article is concerned with the well-posedness as well as long-term dynamics of a wide class of non-autonomous,non-local,fractional,stochastic Fitz Hugh-Nagumo systems driven by nonlinear noise defined on the entire space RN.The well-posedness is proved for the systems with polynomial drift terms of arbitrary order as well as locally Lipschitz nonlinear diffusion terms by utilizing the pathwise and mean square uniform estimates.The mean random dynamical system generated by the solution operators is proved to possess a unique weak pullback mean random attractor in a Bochner space.The existence of invariant measures is also established for the autonomous systems with globally Lipschitz continuous diffusion terms.The idea of uniform tail-estimates of the solutions in the appropriate spaces is employed to derive the tightness of a family of probability distributions of the solutions in order to overcome the non-compactness of the standard Sobolev embeddings on RNas well as the lack of smoothing effect on one component of the solutions.The results of this paper are new even when the fractional Laplacian is replaced by the standard Laplacian.

关 键 词:fractional Fitz Hugh-Nagumo system weak pullback mean random attractor invariant measure nonlinear noise unbounded domain 

分 类 号:O19[理学—数学]

 

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