Advanced search
Publication Cover
Cogent Mathematics & Statistics Volume 6, 2019 - Issue 1
Submit an article Journal homepage
538
Views
2
CrossRef citations to date
0
Altmetric
Research Article

Almost sure asymptotic stability for some stochastic partial functional integrodifferential equations on Hilbert spaces

Moustapha DieyeDépartement de Mathématiques, Université Gaston Berger de Saint-Louis, UFR SAT, B.P. 234, Saint-Louis, SénégalORCID Iconhttps://orcid.org/0000-0002-8775-7473View further author information
ORCID Icon,
Mamadou Abdoul DiopFaculté des Sciences Semlalia, Département de Mathématiques, Université Cadi Ayyad, B.P. 2390, Marrakesh, MoroccoCorrespondence[email protected] [email protected]
View further author information
&
Khalil EzzinbiFaculté des Sciences Semlalia, Département de Mathématiques, Université Cadi Ayyad, B.P. 2390, Marrakesh, MoroccoView further author information
|
Alain BourgetMathematics, California State University Fullerton, USAView further author information
(Reviewing editor)
Article: 1602928 | Received 25 Mar 2018, Accepted 29 Mar 2019, Published online: 25 Apr 2019

References

  • Balachandran, K., & Sakthivel, R. (2001). Controllability of integrodifferential systems in Banach spaces. Applied Mathematics and Computation, 118, 63–15. doi:10.1016/S0096-3003(00)00040-0
  • Da Prato, G., & Zabczyk, J. (1992a). Stochastic equations in infinite dimensions. Cambridge: Cambridge University Press.
  • Diagana, T., Hernàndez, M. E., & Dos Santos, J. P. C. (2009). Existence of asymptotically almost automorphic solutions to some abstract partial neutral integro-differrential equations. Nonlinear Analysis, 71, 248–257. doi:10.1016/j.na.2008.10.046
  • Dieye, M., Diop, M. A., & Ezzinbi, K. (2016a). Controllability for some integrodifferential equations driven by vector measures. Mathematical Methods in Applied Sciences. doi:10.1002/mma.4125
  • Dieye, M., Diop, M. A., & Ezzinbi, K. (2016b). Necessary conditions of optimality for some stochastic integrodifferential equations of neutral type on Hilbert spaces. Applied Mathematics and Optimization. doi:10.1007/s00245-016-9377-x
  • Dieye, M., Diop, M. A., & Ezzinbi, K. (2016c). On exponential stability of mild solutions for stochastic partial integrodifferential equations. Statistics and Probability Letters, 123, 61–76.
  • Dieye, M., Diop, M. A., & Ezzinbi, K. (2017). Optimal feedback control law Some stochastic integrodifferential equations on Hilbert spaces. European Journal of Control. doi:10.1016/j.ejcon.2017.05.006
  • Diop, M. A., Ezzinbi, K., & Lo, M. (2012). Existence and uniqueness of mild solutions to some neutral stochastic partial functional integrodifferential equations with non-Lipschitz coefficients, Hindawi Publishing Corporation. International Journal of Mathematics and Mathematical Sciences, Art.ID 748590/12 pages doi:10.1155/2012/748590
  • Dos Santos, J. P. C., Guzzo, S. M., & Rabelo, M. N. (2010). Asymptotically almost periodic solutions for abstract partial neutral Integro-differential equation, Hindawi Publishing Corporation. Advances in Difference Equations, 2010, 26.
  • Ezzinbi, K., & Ghnimi, S. (2010). Existence and regularity of solutions for neutral partial functional integrodifferential equations. Nonlinear Analysis: RealWorld Applications, 11, 2335–2344. doi:10.1016/j.nonrwa.2009.07.007
  • Govindan, T. E. (2002). Existence and stability of solutions of stochastic semilinear functional differential equations. Stochastics Analysis Applications, 20, 1257–1280. doi:10.1081/SAP-120015832
  • Govindan, T. E. (2003). Stability of mild solutions of stochastic evolution equations with variable delay. Stochastics Analysis Applications, 5, 1059–1077. doi:10.1081/SAP-120022863
  • Grimmer, R. C. (1982). Resolvent opeators for integral equations in a Banach space. Transactions of the American Mathematical Society, 273, 333–349. doi:10.1090/S0002-9947-1982-0664046-4
  • Liu, K. (2006). Stability of infinite dimensional stochastic differential equations with applications. London: Chapman and Hall, CRC.
  • Liu, K., & Shi, Y. (2006). Razuminkhin-type theorems of infinite dimensional stochastic functional differential equations. IFIP, System, Control, Modelling Optimization, 237–247Liu, K., & Shi, Y. (2006). Razuminkhin-type theorems of infinite dimensional stochastic functional differential equations. IFIP, System, Control, Modelling Optimization, 202, 237–247.
  • Liu, K., & Truman, A. (2000). A note on almost sure exponential stability for stochastic partial functional differential equations. Statistics and Probability Letters, 50, 273–278. doi:10.1016/S0167-7152(00)00103-6
  • Sathya, R., & Balachandran, K. (2012). Controllability of Sobolev-type neutral stochastic mixed integrodifferential systems. European Journal of Mathematical Sciences, 1(1), 68–87.
  • Taniguchi, T. (1995). Asymptotic stability theorems of semilinear stochastic evolution equations in Hilbert spaces. Stochastics and Stochastics Reports, 53, 41–52. doi:10.1080/17442509508833982
  • Taniguchi, T. (1998). Almost sure exponential stability for stochastic partial functional differential equations. Stochastics Analysis Applications, 16, 965–975. doi:10.1080/07362999808809573
  • Taniguchi, T., Liu, K., & Truman, A. (2002). Uniqueness and asymptotic behavior of mild solution stochastic functional differential equations in Hilbert spaces. Journal of Differential Equations, 181, 72–91. doi:10.1006/jdeq.2001.4073

Related research

People also read lists articles that other readers of this article have read.

Recommended articles lists articles that we recommend and is powered by our AI driven recommendation engine.

Cited by lists all citing articles based on Crossref citations.
Articles with the Crossref icon will open in a new tab.