Title :
Asymptotic mean square stability analysis for a stochastic delay differential equation
Author :
Xue, Peng ; Yamamoto, Shigeru
Author_Institution :
Grad. Sch. of Natural Sci. & Technol., Kanazawa Univ., Ishikawa, Japan
Abstract :
For a stochastic delay differential equation, the effects of noise and time delay are discussed in the sense of mean square stability. Neither time delay nor noise play bad roles for the differential equations and both of them are ubiquitous in nature. The so-called domain subdivision approach is taken to study the stability regions in terms of the parameters of a given equation and the Ito formula is employed to deal with the fluctuation noise. An interesting result demonstrated in this paper shows that noise with appropriate power could reduce the influence of time delay.
Keywords :
asymptotic stability; delays; differential equations; least mean squares methods; stochastic systems; Ito formula; asymptotic mean square stability analysis; domain subdivision approach; fluctuation noise; noise delay; stochastic delay differential equation; time delay; Asymptotic stability; Delay; Delay effects; Equations; Noise; Stability analysis; Stochastic systems; Stability; Stochastic systems; Time delay;
Conference_Titel :
SICE Annual Conference (SICE), 2011 Proceedings of
Conference_Location :
Tokyo
Print_ISBN :
978-1-4577-0714-8
