[1]	Adler M, Bombieri M, Engel K J. On perturbations of generators of C0-semigroups. Abstract and Applied Analysis, Hindawi, 2014

[2]	Bellman R, Cooke K. Differential Difference Equations. London Academic Press Inc., 1963

[3]	Chai S G, Guo B Z. Well-posedness and regularity of weakly coupled wave-plate equation with boundary control and observation. J Dyn Control Syst, 2009, 15 (3): 331- 358 CrossRef Google scholar

[4]	Chai S G, Guo B Z. Feedbackthrough operator for linear elasticity system with boundary control and observation. SIAM J Control Optim, 2010, 48 (6): 3708- 3734 CrossRef Google scholar

[5]	Curtain R F, Logemann H, Townley S, Zwart H. Well-posedness, stabilizability, and admissibility for Pritchard-Salamon systems. J Math Systems Estim Control, 1997, 7: 439- 476

[6]	DeLaubenfels R. Bounded, Commuting multiplicative perturbations of strongly continuous group generators. Houston J Math, 1991, 17: 299- 310

[7]	Desch W, Lasiecka I, Schapacher W. Feedback boundary control problems for linear semigroups. Isarel Journal of Mathematics, 1985, 51 (3): 171- 207

[8]	Desch G W, Schappacher W. Some Generation Results for Perturbed Semigroups, In: Semigroup Theory and Applications. Lecture Notes in Pure and Applied Mathematics, 1989, 116: 125- 152

[9]	Dorroh J R. Contraction semigroups in a Banach space. Pac J Math, 1966, 19: 35- 38 CrossRef Google scholar

[10]	Eidus D. The perturbed Laplace operator in a weighted L2 space. Journal of Functional Analysis, 1991, 100: 400- 410 CrossRef Google scholar

[11]	Engel K J. On the characterization of admissible control and observation operators. Systems Control Lett, 1998, 34: 25- 27

[12]	Engel K -J, Nagel R. One-Parameter Semigroups for Linear Evolution Equations. Springer-Verlag, 2000

[13]	Grabowski P, Callier F M. Admissible observation operators, semigroup criteria of admissibility. Integral Equations Operator Theory, 1996, 25: 182- 189 CrossRef Google scholar

[14]	Greiner G. Perturbing the boundary condition of a generator. Houston J of Math, 1987, 13: 213- 229

[15]	Guo B Z, Shao Z C. Regularity of a Schrödinger equation with Dirichlet control and collocated observation. Systems Control Lett, 2005, 54: 1135- 1142 CrossRef Google scholar

[16]	Guo B Z, Zhang Z -X. The regularity of the wave equation with partial Dirichlet control and collocated observation. SIAM J. Control Optim, 2005, 44: 1598- 1613 CrossRef Google scholar

[17]	Guo B Z, Wang J M, Yung S P. On the C0-semigroup generation and exponential stability resulting from a shear force feedback on a rotating beam. Systems Control Lett, 2005, 54: 557- 574 CrossRef Google scholar

[18]	Guo B Z, Shao Z C. Regularity of an Euler-Bernoulli plate equation with Neumann control and collocated observation. J Dyn Control Syst, 2006, 12: 405- 418 CrossRef Google scholar

[19]	Guo B Z, Shao, Z C. On well-posedness, regularity and exact controllability for problems of transmission of plate equation with variable coefficients. Quart Appl Math, 2007, 65 (4): 705- 736 CrossRef Google scholar

[20]	Guo B Z, Zhang Z X. Well-posedness of systems of linear elasticity with Dirichlet boundary control and observation. SIAM J Control Optim, 2009, 48: 2139- 2167 CrossRef Google scholar

[21]	Guo F M, Zhang Q, Huang F L. On well-posedness and admissible stabilizability for Pritchard-Salamon systems. Applied Math Lett, 2003, 16: 65- 70 CrossRef Google scholar

[22]	Gustafson K, Lumer G. Multiplicative perturbations of semigroup generators. Pac J Math, 1972, 41: 731- 742 CrossRef Google scholar

[23]	Hadd S. Exact controllability of infinite dimensional systems persists under small perturbations. J Evol Equ, 2005, 5: 545- 555 CrossRef Google scholar

[24]	Hadd S, Idrissi A. On the admissibility of observation for perturbed C0-semigroups on Banach spaces. Systems Control Lett, 2006, 55: 1- 7 CrossRef Google scholar

[25]	Hadd S, Boulite S, Nounou H, Nounou M. On the admissibility of control operators for perturbed semigroups and application to time-delay systems, Joint 48th IEEE Conference on Decision and Control and 28th Chinese Control Conference, Shanghai, P. R. China, December 16–18, 2009

[26]	Jung M. Multiplicative perturbations in semigroup theory with the (Z)-condition. Semigroup Forum, 1996, 52: 197- 211 CrossRef Google scholar

[27]	Kalman R E, Ho Y C, Narendra K S. Controllability of linear dynamical systems, Contributions to Differential Equations, 1963, 1: 189- 213

[28]	Kato T. Perturbation Theory for Linear Operators, vol. 132 of Grundlehren der Mathematischen Wissenschaften, Springer, New York, 1966

[29]	Komornik V. Exact Controllability and Stabilization: The Multiplier Method. Wiley, New York, 1994

[30]	Lagnese J E, Lions J L. Modeling Analysis and Control of Thin Plates. Masson Paris. 1988

[31]	Lasiecka I, Triggiani R. Sharp regularity theory for second order hyperbolic equations of Neumann type I: L2-nonhomogeneous data. Ann Mat Pura Appl, 1990, 157 (4): 285- 367

[32]	Lasiecka I, Triggiani R. Control Theory for Partial Differential Equations: Continuous and Approximation Theories I: Abstract Parabolic Systems. Cambridge University Press, 2000

[33]	Lasiecka I, Triggiani R. Control Theory for Partial Differential Equations: Continuous and Approximation Theories II: Abstract Hyperbolic-Like Systems over a Finite Time Horizon. Cambridge University Press, 2000

[34]

Lasiecka I, Triggiani R. Linear hyperbolic and Petrowski type PDEs with continuous boundary control → boundary observation open loop map: Implication on nonlinear boundary stabilization with optimal decay rates, in Sobolev Spaces in Mathematics III, Applications in Mathematical Physics. (Ed. by V. Isakov), Ed International Mathematical Series, Vol. 10: 187–276. Springer, 2009

[35]	Lions J L. Exact controllability, stabilization, and perturbations for distributed systems. SIAM Rev, 1988, 30: 1- 68 CrossRef Google scholar

[36]	Liu X F, Xu G Q. Exponential stabilization for Timoshenko beam with distributed delay in the boundary control. Abstract and Applied Analysis, Hindawi, 2013

[37]	Mei Z D, Peng J G. On invariance of p-admissibility of control and observation operators to q-type of perturbations of generator of C0-semigroup. Systems Control Lett, 2010, 59: 470- 475 CrossRef Google scholar

[38]	Mei Z D, Peng J G. Robustness of exact p-controllability and exact p-observability to q-type of perturbations of the generator. Asian Journal of Control, 2014, 16 (4): 1164- 1168 CrossRef Google scholar

[39]	Metivier G, Zumbrun K. Hyperbolic boundary value problems for symmetric systems with variable multiplicities, J Differential Equations, 2005, 211: 61- 134 CrossRef Google scholar

[40]	Miyadera I. On perturbation theory for semi-groups of operators. Tohoku Mathematical Journal, 1966, 18: 299- 310

[41]	Pazy A. Semigroups of Linear Operators and Applications to Partial Differential Equations. Berlin: Springer-Verlag, 1983

[42]	Russell D L. Nonharmonic Fourier series in the control theory of distributed parameter systems. J Math Anal Appl, 1967, 18: 542- 560 CrossRef Google scholar

[43]	Russell D L. Controllability and stabilizability theory for linear partial differential equations: Recent progress and open questions. SIAM Rev, 1978, 20: 639- 739 CrossRef Google scholar

[44]	Shang Y F, Xu G Q. Dynamic feedback control and exponential stabilization of a compound system. J Math Anal Appl, 2015, 422: 858- 879 CrossRef Google scholar

[45]	Staffans O J, Weiss G. Transfer functions of regular linear systems part III: inversions and duality. Integral Equations and Operator Theory, 2004, 49 (4): 517- 558

[46]	Staffans O J. Well-Posed Linear Systems. Cambridge University Press, 2007

[47]	Triggiani R. Wave equation on a bounded domain with boundary dissipation: An operator approach. J Math Anal Appl, 1989, 137: 438- 461 CrossRef Google scholar

[48]	Triggiani R. Global exact controllability on H1(Γ0)(Ω)×L2(Ω) of semilinear wave equations with Neumann L2([0, T], L2(Γ1))-boundary control. In Control Theory of Partial Differential Equations. Ed: Imanuvilov et al., 273–336. Chapman & Hall, 2005

[49]	Voigt J. On the perturbation theory for strongly continuous semigroups. Mathematische Annalen, 1977, 229 (2): 163- 171 CrossRef Google scholar

[50]	Wang H, Xu G Q. Exponential stabilization of 1-d wave equation with input delay. WSEAS Trans Math, 2013, 12: 1001- 1013

[51]	Weiss G. Admissibility of input elements for diagonal semigroups on l2. Systems Control Lett, 1988, 10: 79- 82 CrossRef Google scholar

[52]	Weiss G. Admissible observation operators for linear semigroups. Israel Journal of Mathematics. 1989, 45: 17- 43

[53]	Weiss G. Regular linear systems with feedback. Mathematics of Control, Signals, and Systems, 1994, 7 (1): 23- 57 CrossRef Google scholar

[54]	Xu G Q, Liu C, Yung S P. Necessary conditions for the exact observability of systems on Hilbert space. Systems Control Lett, 2008, 57 (3): 222- 227 CrossRef Google scholar

[55]	Xu G Q, Wang H X. Stabilization of Timoshenko beam system with delay in the boundary control. INT J Control, 2013, 86: 1165- 1178 CrossRef Google scholar

[56]	Zwart H. Sufficient conditions for admissibility. Systems Control Lett, 2005, 54: 973- 979 CrossRef Google scholar