[1]
|
W. Arendt, C. Batty, M. Hieber and F. Neubrander, Vector-valued Laplace transforms and Cauchy problems, Springer Basel, 2001.
Google Scholar
|
[2]
|
G. Arthi, H. P. Ju and H. Y. Jung, Existence and controllability results for second-order impulsive stochastic evolution systems with state-dependent delay, Appl. Math. Comput., 2014, 248, 328-341.
Google Scholar
|
[3]
|
K. Balachandran and J. H. Kim, Remarks on the paper "Controllability of second order differential inclusion in Banach spaces"[J. Math. Anal. Appl., 2003285, 537-550], J. Math. Anal. Appl., 2006, 324(1), 746-749.
Google Scholar
|
[4]
|
A. E. Bashirov and N. I. Mahmudov, On concepts of controllability for deterministic and stochastic systems, SIAM J. Control Optim., 1999, 37, 1808-1821.
Google Scholar
|
[5]
|
H. Chen, C. Zhu and Y. Zhang, A note on exponential stability for impulsive neutral stochastic partial functional differential equations, Appl. Math. Comput., 2014, 227, 139-147.
Google Scholar
|
[6]
|
S. Das, D. Pandey and N. Sukavanam, Existence of solution and approximate controllability of a second-order neutral stochastic differential equation with state-dependent delay, Acta Mathematica Scientia, 2016, 36B(5), 1509-1523.
Google Scholar
|
[7]
|
H. O. Fattorini, Controllability of higher order linear systems, In Mathematical Theory of Control, Academic Press, New York, 1967, 301-312.
Google Scholar
|
[8]
|
H. O. Fattorini, Second-order linear differential equations in Banach spaces, 108, Elsevier Sience, North Holland, 1985.
Google Scholar
|
[9]
|
J. K. Hale and J. Kato, Phase space for retarded equations with infinite delay, Funkcialaj Ekvacioj, 1978, 21, 11-41.
Google Scholar
|
[10]
|
Y. Hino, S. Murakami and T. Naito, Functional differential equations with infinite delay, In:Lecture Notes in Mathematics, 1473, Springer-Verlag, Berlin, 1991.
Google Scholar
|
[11]
|
J. R. Kang, Y. C. Kwun and J. Y. Park, Controllability of the second-order differential inclusion in Banach spaces, J. Math. Anal. Appl., 2003, 285, 537-550.
Google Scholar
|
[12]
|
J. Klamka, Stochastic controllability and minimum energy control of systems with multiple delays in control, Appl. Math. Comput., 2008, 206, 704-715.
Google Scholar
|
[13]
|
M. L. Li and J. L. Ma, Approximate controllability of second-order impulsive functional differential system with infinite delay in Banach spaces, J. Appl. Anal. Comput., 2016, 6(2), 492-514.
Google Scholar
|
[14]
|
N. I. Mahmudov and M. A. McKibben, Approximate controllability of secondorder neutral stochastic evolution equations, Dynamics of Continuous, Discrete and Impulsive Systems, Series B:Applications and Algorithms, 2006, 13, 619-634.
Google Scholar
|
[15]
|
M. Martelli, A Rothe type theorem for noncompact acyclic-valued map, Boll. Un. Mat. Ital., 1975, 4, 70-76.
Google Scholar
|
[16]
|
P. Muthukumar and C. Rajivganthi, Approximate controllability of secondorder neutral stochastic differential equations with infinite delay and poisson jumps, J. Systems Science and Complexity, 2015, 28, 1033-1048.
Google Scholar
|
[17]
|
C. Parthasarathy and M. M. Arjunan, Controllability results for second-order impulsive stochastic functional differential systems with state-dependent delay, Electronic Journal of Mathematical Analysis and Applications, 2013, 1(1), 88-109.
Google Scholar
|
[18]
|
G. D. Prato and J. Zabczyk, Stochastic equations in infinite dimensions, Cambridge University Press, Cambridge, 1992.
Google Scholar
|
[19]
|
L. J. Shen and J. T. Sun, Approximate controllability of stochastic impulsive functional systems with infinite delay, Automatica, 2012, 48, 2705-2709.
Google Scholar
|
[20]
|
C. C. Travis and G. F. Webb, Compactness, regularity, and uniform continuity properties of strongly continuous cosine families, Houston Journal of Mathematics, 1977, 3, 555-567.
Google Scholar
|
[21]
|
C. C. Travis and G. F. Webb, Cosine families and abstract nonlinear secondorder differential equations, Acta Mathematica Hungarica, 1978, 32, 76-96.
Google Scholar
|
[22]
|
C. C. Travis and G. F. Webb, Second order differential equations in Banach space, Proceedings International Symposium on Nonlinear Equations in Abatract Spaces, Academic Press, New York, 1987, 331-361.
Google Scholar
|
[23]
|
R. Triggiani, On the relationship between first and second-order controllable systems in Banach spaces, Springer-verlag, Berlin, Notes in Control and Inform, Sciences, 1978, 370-393.
Google Scholar
|
[24]
|
R. Triggiani, On the relationship between first and second order controllable systems in Banach spaces, SIAM J. Control Optim., 1978, 16, 847-859.
Google Scholar
|
[25]
|
Z. M. Yan and X. X. Yan, Existence of solutions for impulsive partial stochastic neutral integrodifferential equations with state-dependent delay, Collectanea Mathematica, 2013, 64, 235-250.
Google Scholar
|