General Decay Pathwise Stability of Neutral Stochastic Differential Equations with Unbounded Delay

• Published in: Acta mathematica Sinica. English series Vol. 27; no. 11; pp. 2153 - 2168
• Main Authors: Hu, Yang Zi, Wu, Fu Ke, Huang, Cheng Ming
• Format: Journal Article
• Language: English
• Published: Heidelberg Institute of Mathematics, Chinese Academy of Sciences and Chinese Mathematical Society 01.11.2011; Springer Nature B.V
• Subjects: Brownian motion; Decay; Decay rate; Delay; Differential equations; Lyapunov functions; Lyapunov函数; Mathematical analysis; Mathematics; Mathematics and Statistics; Stability; Stochastic models; Stochasticity; Studies; 中立型; 唯一性定理; 无界时滞; 无限延迟; 稳定性; 衰变率; 随机微分方程; Pathwise stability; 34K40; 60H10; 34K50; unbounded delay; general decay rate; matrix; neutral stochastic differential equations; 34K20
• ISSN: 1439-8516; 1439-7617
• DOI: 10.1007/s10114-011-9456-5

Without the linear growth condition, by the use of Lyapunov function, this paper estab- lishes the existence~and-uniqueness theorem of global solutions to a class of neutral stochastic differen- tim equations with unbounded delay, and examines the pathwise stability of this solution with general decay rate. As an application of our results, this paper also considers in detail a two-dimensional unbounded delay neutral stochastic differential equation with polynomial coefficients.