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[1]B.Z.Guo and Z.D.Mei, Output feedback stabilization for a classof first-order equation setting ofcollocatedwell-posed linear systems with time delay in observation, IEEE Transactions on Automatic Control, to appear.
[2] H.Feng, B.Z.Guo, and X.H.Wu, Trajectory planning approach to output tracking for a 1-D wave equation,IEEE Transactions on Automatic Control, to appear.
[3] H.C.Zhou, B.Z.Guo, and S.H.Xiang, Performance output tracking formulti-dimensional heat equation subject to unmatched disturbance and non-collocated control , IEEE Transactions on Automatic Control, to appear.
[4] Z.D.Mei and B.Z.Guo,Stabilization for infinite-dimensional linear systems with bounded control and time delayed observation,Systems & Control Letters, 134(2019),104532.
[5] J.Liu and B.Z.Guo,A novel semi-discrete scheme preserving uniformly exponential stability for an Euler-Bernoulli beam, Systems & Control Letters,134(2019), 104518.
[6]F.F.Jin and B.Z.Guo, Boundary output tracking for an Euler-Bernoulli beam equation with unmatched perturbations from a known exosystem, Automatica, 109(2019), 108507, 9 pp.
[7] W.Kang and B.Z.Guo, Arbitrary decay for boundary stabilization of Schrodinger equation subject to unknown disturbance by Lyapunov approach, IFAC Journal of Systems and Control,7(2019),100033.
[8]Z.L.Zhao and B.Z.Guo, A novel extended state observer for output tracking of MIMO systems with mismatched uncertainty, IEEE Transactions on Automatic Control,63(2018), 211-218.
[9] F.F.Jinand B.Z. Guo, Performance boundary output tracking for one-dimensional heat equation with boundary unmatched disturbance,Automatica, 96(2018),1-10.
[10] H.C.Zhou and B.Z.Guo, Boundary feedback stabilization foranunstable time fractional reaction diffusion equation,SIAM Journal on Control and Optimization, 56(2018), 75-101.
[11] Z.L.Zhao and B.Z.Guo,A nonlinear extended state observer based onfractional power functions, Automatica, 81(2017), 286-296.
[12] H.C.Zhou and B.Z.Guo, Unknown input observer design and output feedback stabilization for multi-dimensional wave equation with boundary control matched uncertainty, Journal of Differential Equations, 263(2017), 2213–2246.
[13]H.Feng and B.Z.Guo,Active disturbance rejection control: New and old results, Annual Reviews in Control, 44(2017), 238-248.
[14] H.Feng and B.Z.Guo, New unknown input observer and output feedback stabilization for uncertain heat equation, Automatica, 86(2017), 1-10.
[15] H.Feng and B.Z.Guo, A new active disturbance rejection control to output feedback stabilization for a one-dimensional anti-stable wave equation withdisturbance,IEEE Transactions on Automatic Control,62(2017),3774-3787.
[16] H.Feng and B.Z.Guo, Observer design andexponential stabilization forwave equation in energy space by boundary displacement measurement only, IEEE Transactions on Automatic Control,62(2017), 1438-1444.
[17] B.Z.Guo and Z.H.Wu, Output tracking for a class of nonlinear systems with mismatched uncertainties by active disturbance rejection control, Systems & Control Letters, 100(2017), 21-31.
[18]B.Z.Guo and H.Q.Yu, Optimal state estimation for non-time invertible evolutionary system, SIAM Journal on Control and Optimization, 54(2016),2754-2786.
[19] B.Z.Guo, Y.S.Xu, and D.H.Yang, Optimal actuator location ofminimum normcontrols for heat equation with general controlleddomain, Journal of Differential Equations,261(2016), 3588-3614.
[20]R.L.Wen, S.G.Chai, and B.Z.Guo, Well-posedness and exact controllability of fourth-order Schrödinger equation with hinged boundary control and collocated observation, Mathematics ofControl, Signals, and Systems,28(2016),article 22.
[21] B.Z.Guo, Z.H.Wu, and H.C.Zhou, Active disturbance rejection control approach to output-feedback stabilization of a class of uncertain nonlinear systems subject to stochastic disturbance, IEEE Transactions on Automatic Control, 61(2016), 1613-1618.
[22] W.Guo and B.Z.Guo, Performance output tracking for a wave equation subject to unmatched general boundaryharmonic disturbance, Automatica,68(2016), 194-202.
[23] H.Feng and B.Z.Guo,Distributeddisturbance estimator and application to stabilization formulti-dimensional wave equation with corrupted boundary observation, Automatica,66(2016),25–33.
[24]Z.L.Zhao and B.Z.Guo, Extended state observer for uncertain lower triangular nonlinear systems,Systems and Control Letters,85(2015), 100-108.
[25] B.Sun and B.Z.Guo,Convergence of an upwind finite-difference scheme forHamilton-Jacobi-Bellman equation in optimal control,IEEE Transactions on Automatic Control, 60(2015), 3012-3017.
[26] H.Feng and B.Z.Guo, On stability equivalence betweendynamic output feedback and staticoutput feedback for a class of second order infinite-dimensional infinite-dimensional systems, SIAM Journal on Control and Optimization,53(2015),1934-1955.
[27] G.J.Zheng, B.Z.Guo, and M.M.Ali, Continuous dependence of optimal controlto controlled domain of actuatorfor heat equation,Systems and Control Letters,79(2015), 30-38.
[28] B.Z.Guo and F.F.Jin,Output feedback stabilization forone-dimensional wave equation subject to boundary disturbance, IEEE Transactions on Automatic Control, 60(2015), 824-830.
[29]B.Z.Guo and D.H.Yang, Optimal actuator location for time and norm optimal control ofnull controllable heat equation, Mathematics ofControl, Signals, and Systems,27(2015), 23–48.
[30]B.Z.Guo and H.C.Zhou, The active disturbance rejection control to stabilization for multi-dimensional wave equationwith boundary control matched disturbance, IEEE Transactions on Automatic Control, 60(2015), 143-157.
[31] F.F.Jin and B.Z.Guo, Lyapunov approach to output feedback stabilization forEuler-Bernoulli beam equation withboundary, Automatica, 52(2015), 95-102.
[32] H.Feng and B.Z.Guo, Output feedback stabilization for unstable wave equation with general corrupted boundary observation, Automatica, 50(2014), 3164-3172.
[33] G.J.Zheng, B.Z.Guo, and M.M.Ali,Stability of optimal control of heat equation withsingular potential, Systems and Control Letters,74(2014) 18-23.
[34] B.Z.Guo and H.C.Zhou, Active disturbance rejection control for rejecting boundary disturbancefrom multi-dimensional Kirchhoffplatevia boundary control, SIAM Journal on Control and Optimization, 52(2014),2800-2830.
[35] Q.Zhang, J.M.Wang and B.Z.Guo, Stabilization of the Euler-Bernoulli equation via boundary connection with heat equation, Mathematics ofControl, Signals, and Systems, 26(2014), 77-118.
[36] B.Z.Guo and L.Zhang, Local null controllability ofChemotaxis system of parabolic-elliptic type, Systems and Control Letters, 65(2014), 106-111.
[37] R.L.Wen, S.G.Chai, and B.Z.Guo, Well-posedness and exact controllability offourth order Schrodinger equation with boundary control and collocated observation, SIAM Journal on Control and Optimization,52(2014),365-396.
[38]B.Z.Guo and Z.L.Zhao, On convergence of the nonlinear active disturbance rejection control for MIMOSystems,SIAM Journal on Control and Optimization, 51(2013), 1727-1757.
[39]B.Z.Guo and Z.L.Zhao, Weak convergence ofnonlinear high-gain tracking differentiator,IEEE Transactions on Automatic Control,58(2013),1074-1080.
[40] B.Z.Guo and F.F.Jin, The active disturbance rejection and sliding mode control approachto the stabilization ofEuler-Bernoulli beam equation withboundary input disturbance, Automatica, 49(2013), 2911-2918.
[41] W.Guo and B.Z.Guo, Parameter estimation and non-collocated adaptive stabilization for a wave equationsubject to general boundaryharmonic disturbance, IEEE Transactions on Automatic Control, 58(2013), 1631-1643.
[42] W.Guo and B.Z.Guo Adaptive output feedback stabilization for one-dimensional wave equation with corrupted observation by harmonic disturbance, SIAM Journal on Control and Optimization, 51(2013), 1679–1706.
[43]B.Z.Guo andF.F.Jin,Sliding mode and active disturbance rejection control to stabilization of one-dimensional anti-stable wave equations subject to disturbance in boundary input, IEEE Transactions on Automatic Control,58(2013),1269-1274.
[44]B.Z.Guo and D.H.Yang, On convergence of boundary Hausdorff measure and application to a boundary shape optimization problem, SIAM Journal on Control and Optimization, 51(2013), 253–272.
[45] B.Z.Guo and Z.C.Shao, Well-posedness and regularity for non-uniformSchrodinger andEuler-Bernoulli equations with boundary control and observation,Quarterly of Applied Mathematics,70(2012), 111-132.
[46] B.Z.Guo and D.H.Yang,Somecompactclasses of open sets under Hausdorffdistance and application toshape optimization,SIAM Journal on Control and Optimization, 50(2012), 222–242.
[47]B.Z.Guo and Z.L.Zhao, On the convergence of extended state observer for nonlinear systems with uncertainty, Systems and Control Letters, 60(2011), 420-430.
[48] M. Krstic, B.Z.Guo and A. Smyshlyaev, Boundary controllers and observers for the linearized Schrodinger equation, SIAM Journal on Control and Optimization, 49(2011), 1479–1497.
[49] J.M.Wang, B.Z.Guo and M.Krstic, Wave equation stabilization by delays equal to even multiples of the wave propagation time,SIAM Journal on Control and Optimization, 49(2011), 517–554.
[50]S.G.Chai and B.Z.Guo, Well-posedness and regularity ofNaghdi'sshell equationunderboundary control, Journal of Differential Equations, 249 (2010) , 3174-3214.
[51] B.Z.Guo and F.F.Jin, Arbitrary decay ratefor two connected strings with joint anti-damping by boundary output feedback, Automatica, 46(2010),1203-1209.
[52] B.Z.Guo and K.Y.Yang, Output feedback stabilization of a one-dimensional Schrodinger equation by boundary observation with time delay, IEEE Transactions on Automatic Control,55(2010), 1226 -1232.
[53] S.G.Chai and B.Z.Guo, Feedthrough operator for linear elasticity system with boundary control and observation, SIAM Journal on Control and Optimization, 48(2010),3708-3734.
[54] B.Z.Guo and T.T.Wu, Approximation of optimal feedback control: A dynamic programming approach, Journal of Global Optimization, 46(2010), 395-422.
[55]B.Z.Guo and Z.X.Zhang, Well-posedness of systems of linear elasticity with Dirichlet boundary control and observation, SIAM Journal on Control and Optimization, 48(2009), 2139-2167.
[56] A.Smyshlyaev, B.Z.Guo and M.Krstic, Arbitrary decay rate for Euler-Bernoulli beam by backstepping boundary feedback, IEEE Transactions on Automatic Control,54(2009), 1134-1140.
[57] B.Z.Guo and K.Y.Yang, Dynamic stabilization of an Euler-Bernoulli beam equation with time delay in boundary observation, Automatica, 45(2009), 1468-475.
[58] B.Z.Guo and W.Guo, The strong stabilization of a one-dimensional wave equation by non-collocated dynamic boundary feedback control,Automatica, 45(2009), 790-797.
[59] B.Z.Guo and Z.C.Shao, Stabilization of an abstract second order system with application to wave equations under non-collocated control and observations, Systems and Control Letters, 58 (2009),334-341.
[60] J.D.Chang and B.Z.Guo, Application of Ingham-Beuling type type theorems to coefficients identifiability of vibrating systems: finite time identifiability , Differential and Integral Equations, 21(2008), 1037-1054.
[61] B.Z.Guo, J.M.Wang and K.Y.Yang, Dynamic stabilization of an Euler-Bernoulli beam under boundary control and non-collocated observation, Systems and Control Letters, 57(2008), 740-749.
[62] M. Krstic, B.Z. Guo, A. Balogh, and A. Smyshlyaev, Control of a tip-force destabilized shear beam by non-collocated observer-based boundary feedback, SIAM Journal on Control and Optimization, 47(2008), 553-574. [GuoKrstic2.pdf]
[63]M. Krstic, B.Z.Guo, A. Balogh and A. Smyshlyaev, Output-feedback stabilization of an unstable wave equation, Automatica, 44(2008), 63-74.
[64] B. Z. Guo and Z.X. Zhang,Well-Posedness and regularity for anEuler-Bernoulli plate with variable coefficients and boundary control and observation, Mathematics of Control, Signals, and Systems, 19(2007), 337-360.
[65]B. Z. Guo and Z. C. Shao, On well-posedness, regularity and exact controllability for problems of transmission ofplate equation with variable coefficients,Quarterly of Applied Mathematics, 65(2007), 705-736.
[66] B.Z. Guo and B. Sun, Numerical solution to the optimal feedback control of continuous casting process, Journal of Global Optimization, 39(2007), 171-195.
[67] J.D. Chang and B.Z. Guo, Identification of variable spacial coefficients for a beam equation from boundary measurement, Automatica, 43(2007), 732-737.
[68] B. Z. Guo and C.Z. Xu,The stabilization of a one-dimensional wave equation by boundary feedback with non-collocated observation, IEEE Transactions on Automatic Control, 52(2007),371-377.
[69] B.Z. Guo and J. M. Wang, Remarks on the application of the Keldysh Theorem to the completeness of root subspace of non-self-adjoint operators and comments on "Spectral operators generated by Timoshenko beam model", Systems and Control Letters, 55(2006), 1029-1032.
[70] B.Z. Guo and H. Zwart, On the relation between stability of continuous- and discrete time evolution equations via the Cayley transform, Integral Equations and Operator Theory, 54(2006), 349-383.
[71] B.Z. Guo and G.Q. Xu, Expansion of solution in terms of generalized eigenfunctions for a hyperbolic system with static boundary condition, Journal of Functional Analysis, 231(2006), 245-268.
[72] B.Z. Guo and J.M. Wang, The well-posedness and stability of a beam equation with conjugate variables assigned at the same boundary, IEEE Transactions on Automatic Control, 50(12)(2005), 2087-2093.
[73] B.Z. Guo and X. Zhang, The regularity of the wave equation with partial Dirichlet control and colocated observation,SIAM Journal on Control and Optimization, 44(5)(2005), 1598-1613.
[74] B.Z. Guo and Z.C. Shao, Regularity of a Schrodinger equation with Dirichlet control and colocated observation, Systems and Control Letters, 54(2005), 1135-1142.
[75] B.Z. Guo, J.M. Wang and S. P. Yung, Boundary stabilization of a flexible manipulator with rotational inertia, Differential and Integral Equations, 18 (9)(2005), 1013-1038.
[76] B.Z. Guo, J.M. Wang and S.P.Yung, On the C0-semigroup generation and exponential stability resulting from a shear force feedback on a rotating beam, Systems and Control Letters, 54(2005), 557-574.
[77] B.Z. Guo and G.Q. Xu, On Basis property of a hyperbolic system with dynamic boundary condition, Differential and Integral Equations, 18(1)(2005), 35-60.
[78] B.Z. Guo and Y. Xie, A sufficient condition on Riesz basis with parentheses of non-selfadjoint operator and application to a serially connected string system under joint feedbacks, SIAM Journal onControl andOptimizations, 43(4)(2004), 1234-1252.
[79]B.Z. Guo and G.Q. Xu, Riesz bases and exact controllability of C0-groups with one-dimensional input operators, Systems and Control Letters, 52(2004), 221-232.
[80]G.Q. Xu and B.Z. Guo, Riesz basis property of evolution equations in Hilbert spaces and application to a coupled string equation, SIAM Journal on Control and Optimization, 42(3)(2003), 966-984.
[81] B.Z. Guo and Y.H. Luo, Riesz basis property of a second order hyperbolic system with collocated scalar input/output, IEEE Transactions on Automatic Control, 47(2002), 693-698.
[82]B.Z. Guo and Y.H. Luo, Controllability and stability of a second order hyperbolic system with collocated sensor/actuator, Systems and Control Letters, 46(1)(2002),45-65.
[83] B.Z. Guo, Riesz basis property and exponential stability of controlled Euler-Bernoulli beam equations with variable coefficients,SIAM Journal on Control and Optimization, 40(6)(2002),1905 - 1923.
[84] B.Z. Guo, Riesz basis approach to the stabilization of a flexible beam with a tip mass, SIAM Journal on Control and Optimization, 39(2001), 1736-1747.
[85] W.D. Zhu, B. Z. Guo and C. D. Jr Mote, Stabilization of a translating tensioned beam through a pointwise control force, ASME Journal of Dynamic Systems, Measurement, and Control, 122(2000) 322-331.
[86] B.Z. Guo and C.Z. Xu, On the spectrum-determined growth condition of a vibration cable with a tip mass, IEEE Transactions on Automatic Control, 45(2000), 89-93.
[87] W.D. Zhu and B.Z. Guo, Free and forced vibration of an axially moving string with an arbitrary velocity profile, ASME Journal ofApplied Mechanics, 65(4)(1998), 901-907.
[88]W.D. Zhu and B.Z. Guo, On Hybrid boundary control of flexible systems, ASME Journal of Dynamic Systems, Measurement, and Control, 119(1997), 836-839. .
[89] B.Z. Guo and W.D. Zhu, On the energy decay of two coulpled strings through a joint damper, Journal of Sound and Vibration, 203(3)(1997), 447-455.
[90]W.D. Zhu, Mote C.D. Jr and B.Z. Guo, Asymptotic distribution of eigenvalues of constrained translating string, ASME Journalof Applied Mechanics, 64(1997), 613-619.
[91] Z.H. Luo and B.Z. Guo, Shear force feedback control of a single link flexible robot with revolute joint, IEEE Transactions on Automatic Control, 42(1)(1997), 53-65.
[92]Z.H. Luo, N. Kitamura and B.Z. Guo, Shear force feedback control of flexible robot arms, IEEE Transactions on Robotics Automation, 11(5)(1995),760-765.
[93] Z.H. Luo and B.Z. Guo, Further theoretical results on direct strain feedback control of flexible robot arms, IEEE Transactionson Automatic Control, 40(4)(1995), 747-751.
[94]W.L. Chan and B.Z. Guo, Global behavior of age-dependent Logistic population models, Journal of MathematicalBiology, 28(1990), 225-235.
[95] W.L. Chan and B.Z. Guo, On the semigroups for age-dependent population dynamics with spatial diffusion, Manuscripta Mathematica, 66(1989), 161-181.
[96]B. Z. Guo and W. L. Chan, A semigroup approach to age-dependent population dynamics with time delay, Communication in Partial Differential Equations, 14(6)(1989), 809-832.