[1] Guo, B.Z. and Wang, J.M. (2019): Control of Wave and Beam PDEs: The Riesz Basis Approach,Communications and Control Engineering Series. Springer, Cham.
[2] 郭宝珠,王军民(2021): 无穷维线性系统的Riesz 基理论, 科学出版社.
[3] Liu, W.W., Paunonen, L. and Wang, J.M. (2022): Robust output regulation of a thermoelastic system, Systems & Control Letters, 167, 105309, 7pp.
[4] Zhang, Y.L., Zhu, M., Li, D.H. and Wang, J.M. (2022): Stabilization of two coupled wave equations with joint anti-damping and non-collocated control, Automatica, 135, 109995, 9pp.
[5] Zhang, H.W., Wang, J.M., and Gu, J.J. (2021): Exponential input-to-state stabilization of an ODE cascaded with a reaction-diffusion equation subject to disturbances, Automatica, 133, 109885, 9pp.
[6] Zhang, Y.L., Zhu, M., Li, D.H. and Wang, J.M. (2021): Static boundary feedback stabilization of an anti-stable wave equation with both collocated and non-collocated measurements, Systems & Control Letters, 154, 104967, 10pp.
[7] Wang, J.W. and Wang, J.M. (2021): Dynamic compensator design of linear parabolic MIMO PDEs in N-dimensional spatial domain, IEEE Transactions on Automatic Control, 66(3), 1399-1406.
[8] Zhang, Y.L., Zhu, M., Li, D.H. and Wang, J.M. (2020): ADRC dynamic stabilization of an unstable heat equation, IEEE Transactions on Automatic Control, 65(10), 4424-4429.
[9] Zhang, Y.L., Zhu, M., Li, D.H. and Wang, J.M. (2020): Dynamic feedback stabilization of an unstable wave equation, Automatica, 121, 109165, 9pp.
[10] Su, L.L., Chen, S., Wang, J.M. and Krstic, M. (2020): Stabilization of 2 × 2 hyperbolic PDEs with recirculation in unactuated channel, Automatica, 120, 109147, 14pp.
[11] Wang, J.M., Wang, F. and Liu, X.D. (2020): Exponential stability of a Schrödinger equation through boundary coupling a wave equation, IEEE Transactions on Automatic Control, 65(7), 3136-3142.
[12] Wang, F. and Wang, J.M. (2020): Stability of an interconnected system of Euler-Bernoulli beam and wave equation through boundary coupling, Systems & Control Letters, 138, Article no. 104664, 8pp.
[13] Liu, J. and Wang, J.M. (2019): Stabilization of one-dimensional wave equation with nonlinear boundary condition subject to boundary control matched disturbance, IEEE Transactions on Automatic Control, 64(7), 3068-3073.
[14] Wang, J.W. and Wang, J.M. (2019): Mixed H 2 /H ∞ sampled-data output feedback control design for a semi-linear parabolic PDE in the sense of spatial L ∞ norm, Automatica, 103, 282-293.
[15] Su, L., Wang, J.M. and Krstic, M. (2018): Boundary feedback stabilization of a class of coupled hyperbolic equations with nonlocal terms, IEEE Transactions on Automatic Control, 63(8), 2633-2640.
[16] Gu, J.J. and Wang, J.M. (2018): Sliding mode control of the Orr–Sommerfeld equation cascaded by both the Squire equation and ODE in the presence of boundary disturbances, SIAM Journal on Control and Optimization, 56(2), 837-867.
[17] Su, L., Guo, W., Wang, J.M. and Krstic, M. (2017): Boundary stabilization of wave equation with velocity recirculation, IEEE Transactions on Automatic Control, 62(9), 4760-4767.
[18] Chentouf, B. and Wang, J.M. (2015): On the stabilization of the disk-beam system via torque and direct strain feedback controls, IEEE Transactions on Automatic Control, 60(11), 3006-3011.
[19] Wang, J.M., Su, L. and Li, H.X. (2015): Stabilization of an unstable reaction-diffusion PDE cascaded with a heat equation, Systems and Control Letters, 76, 8-18.
[20] Wang, J.M., Liu, J., Ren, B. and Chen, J. (2015): Sliding mode control to stabilization of cascaded heat PDE-ODE systems subject to boundary control matched disturbance, Automatica, 52, 23-34.
[21] Chen, X., Chentouf, B. and Wang, J.M. (2014): Nondissipative torque and shear force controls of a rotating flexible structure, SIAM Journal on Control and Optimization, 52(5), 3287-3311.
[22] Ren, B., Wang, J.M. and Krstic, M. (2013): Stabilization of an ODE-Schrodinger cascade, Systems and Control Letters, 62(6), 503-510.
[23] Wang, J.M., Ren, B. and Krstic, M. (2012): Stabilization and Gevrey regularity of a Schrödinger equation in boundary feedback with a heat equation, IEEE Transactions on Automatic Control, 57(1), 179-185.
[24] Wang, J.M., Guo, B.Z. and Krstic, M. (2011): Wave equation stabilization by delays equal to even multiples of the wave propagation time, SIAM Journal on Control and Optimization, 49(2), 517-554.
[25] Chentouf, B. and Wang, J.M. (2008): A Riesz basis methodology for proportional and integral output regulation of a one-dimensional diffusive wave equation, SIAM Journal on Control and Optimization, 47(5), 2275-2302.
[26] Guo, B.Z., Wang, J.M. and Yang, K.Y. (2008): Dynamic stabilization of an Euler-Bernoulli beam under boundary control and non-collocated observation, Systems and Control Letters, 57(9), 740-749.
[27] Guo, B.Z. and Wang, J.M. (2006): 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(12), 1029-1032.
[28] Wang, J.M. and Yung, S.P. (2006): Stability of a nonuniform Rayleigh beam with indefinite damping, Systems and Control Letters, 55(10), 863-870.
[29] Guo, B.Z. and Wang, J.M. (2005): The well-posedness and stability of a beam equation with conjugate variables assigned at the same boundary point, IEEE Transactions on Automatic Control, 50(12), 2087-2093.
[30] Wang, J.M., Xu, G.Q. and Yung, S.P. (2005): Exponential stabilization of laminated beams with structural damping and boundary feedback controls, SIAM Journal on Control and Optimization, 44(5), 1575-1597.
[31] Guo, B.Z., Wang, J.M. and Yung, S.P. (2005): On the C 0 -semigroup generation and exponential stability resulting from a shear force feedback on a rotating beam, Systems and Control Letters, 54(6), 557-574.
[32] Wang, J.M., Xu, G.Q. and Yung, S.P. (2004): Exponential stability of variable coefficients Rayleigh beams under boundary feedback controls: a Riesz basis approach, Systems and Control Letters, 51(1), 33-50.