Existence of Solution of Nonlinear Second Order Neutral Stochastic Differential Inclusions with Infinite Delay
The paper is concerned with the existence of solution
of nonlinear second order neutral stochastic differential inclusions
with infinite delay in a Hilbert Space. Sufficient conditions for the
existence are obtained by using a fixed point theorem for condensing
maps.
[1] Da Prato, Zabczyk, Stochastic Equations in Infinite Dimensions,
Cambridge University Press, Cambridge, 1992.
[2] Taniguchi, Successive approximations to solutions of stochastic
differential equations, J.Differential Equations 96(1992), 152-169.
[3] R.Pettersson, Yosida approximations for multivalued stochastic
differential equations, Stochastics Stochastics Rep. 52(1995), 107-120.
[4] M.Benchohra, S.K Ntouyas, Nonlocal Cauchy Problems for Neutral
Functional Differential and Integrodifferential Inclusions in Banach
Spaces, Journal of Mathematical Analysis and Applications, 258(2), 2001,
573-590.
[5] M.Benchohra, J. Henderson, S.K Ntouyas, Existence Results for
Impulsive Multivalued Semilinear Neutral Functional Differential
Inclusions in Banach Spaces, J. Math. Anal. Appl. 285(2003)37-49.
[6] P. Balasubramaniam, Existence of solution of functional stochastic
differential inclusions, Tamkang Journal Of Mathematics,
33(2002),35-43.
[7] P. Balasubramaniam and D. Vinayagam, Existence of solutions of
nonlinear neutral stochastic differential inclusions in a Hilbert space,
Stochastic Analysis and Applications, 23(2005),137-151.
[8] J. Wu, Theory and Applications of Partial Functional Differential
Equations, Springer-Verlag, New York, 1996.
[9] M. Martelli, A Rothe’s type theorem for noncompact acyclic-valued map,
Boll.Un.Mat.Ital. 11:(3)(1975), 70-76.
[10] K. Deimling, Multivalued Differential Equations, de Gruyter, Berlin,
New York,1992.
[11] S. Hu, N.Papageorgiou, Handbook of Multivalued Analysis, Theory, vol.
1, Kluwer Academic, Dordrecht, Boston, London, 1997.
[12] J. K. Goldstein, Semigroups of Linear Operators and Applications
Oxford University Press, New York, NY, 1985.
[13] O. Fattorini, Ordinary differential equations in linear topological spaces
I, J.Diff. Eqs.5(1968), 72-105.
[14] O. Fattorini, Ordinary differential equations in linear topological spaces
II, J.Diff. Eqs.6(1969), 50-70.
[15] C. C. Travis and G. F. Webb, Cosine families and abstract nonlinear
second-order differential equations, Acta. Math. Hungarica, 32 (1978),
75-96.
[16] C. C. Travis and G. F. Webb, Second-Order Differential Equations in
Banach Spaces, Proceedings of the International Symposium on Nonlinear
Equations in Abstract Spaces, Academic Press, Now York, Ny, pp.
331-361,1978.
[17] A. Lasota, and Z. Optal, Application of the Kakutani-Ky-Fan theorem in
the theory of ordinary differential equations or noncompact acyclic-valued
map, Bull. Acad. Polon. Sci. Ser. Sci. Math. Astronom. Phys. 13(1965),
781-786.
[1] Da Prato, Zabczyk, Stochastic Equations in Infinite Dimensions,
Cambridge University Press, Cambridge, 1992.
[2] Taniguchi, Successive approximations to solutions of stochastic
differential equations, J.Differential Equations 96(1992), 152-169.
[3] R.Pettersson, Yosida approximations for multivalued stochastic
differential equations, Stochastics Stochastics Rep. 52(1995), 107-120.
[4] M.Benchohra, S.K Ntouyas, Nonlocal Cauchy Problems for Neutral
Functional Differential and Integrodifferential Inclusions in Banach
Spaces, Journal of Mathematical Analysis and Applications, 258(2), 2001,
573-590.
[5] M.Benchohra, J. Henderson, S.K Ntouyas, Existence Results for
Impulsive Multivalued Semilinear Neutral Functional Differential
Inclusions in Banach Spaces, J. Math. Anal. Appl. 285(2003)37-49.
[6] P. Balasubramaniam, Existence of solution of functional stochastic
differential inclusions, Tamkang Journal Of Mathematics,
33(2002),35-43.
[7] P. Balasubramaniam and D. Vinayagam, Existence of solutions of
nonlinear neutral stochastic differential inclusions in a Hilbert space,
Stochastic Analysis and Applications, 23(2005),137-151.
[8] J. Wu, Theory and Applications of Partial Functional Differential
Equations, Springer-Verlag, New York, 1996.
[9] M. Martelli, A Rothe’s type theorem for noncompact acyclic-valued map,
Boll.Un.Mat.Ital. 11:(3)(1975), 70-76.
[10] K. Deimling, Multivalued Differential Equations, de Gruyter, Berlin,
New York,1992.
[11] S. Hu, N.Papageorgiou, Handbook of Multivalued Analysis, Theory, vol.
1, Kluwer Academic, Dordrecht, Boston, London, 1997.
[12] J. K. Goldstein, Semigroups of Linear Operators and Applications
Oxford University Press, New York, NY, 1985.
[13] O. Fattorini, Ordinary differential equations in linear topological spaces
I, J.Diff. Eqs.5(1968), 72-105.
[14] O. Fattorini, Ordinary differential equations in linear topological spaces
II, J.Diff. Eqs.6(1969), 50-70.
[15] C. C. Travis and G. F. Webb, Cosine families and abstract nonlinear
second-order differential equations, Acta. Math. Hungarica, 32 (1978),
75-96.
[16] C. C. Travis and G. F. Webb, Second-Order Differential Equations in
Banach Spaces, Proceedings of the International Symposium on Nonlinear
Equations in Abstract Spaces, Academic Press, Now York, Ny, pp.
331-361,1978.
[17] A. Lasota, and Z. Optal, Application of the Kakutani-Ky-Fan theorem in
the theory of ordinary differential equations or noncompact acyclic-valued
map, Bull. Acad. Polon. Sci. Ser. Sci. Math. Astronom. Phys. 13(1965),
781-786.
@article{"International Journal of Engineering, Mathematical and Physical Sciences:62832", author = "Yong Li", title = "Existence of Solution of Nonlinear Second Order Neutral Stochastic Differential Inclusions with Infinite Delay", abstract = "The paper is concerned with the existence of solution
of nonlinear second order neutral stochastic differential inclusions
with infinite delay in a Hilbert Space. Sufficient conditions for the
existence are obtained by using a fixed point theorem for condensing
maps.
", keywords = "Mild solution, Convex multivalued map, Neutral
stochastic differential inclusions.", volume = "8", number = "8", pages = "1119-7", }
