1. A. Hayat and P. Shang, Exponential stability of density-velocity systems with boundary conditions and source term for the $H^{2}$ norm,preprint, 2021.
2. C.-M. Brauner,R. Roussarie, L.W. Zhang and P. Shang, Existence of a traveling wave solution in a free interface problem with fractional order kinetics,Journal of Differential Equations. 281, 105-147, 2021.
3. J.-M. Coron, L. Hu, G. Olive and P. Shang, Boundary stabilization in finite time of one-dimensional linear hyperbolic balance laws with coefficients depending on time and space,Journal of Differential Equations. 271,1109-1170, 2021.
4.J.X. Chu, P. Shang and Z.Q. Wang, Controllability and stabilization of a conservation law modeling a highly re-entrant manufacturing system,Nonlinear Analysis.189, 2019.
5.A. Hayat and P. Shang, A quadratic Lyapunov function for Saint-Venant equations with arbitrary friction and space-varying slope,Automatica, 100, 52-60,2019.
6.G. Bastin, J.-M. Coron, A. Hayat and P. Shang, Exponential boundary feedback stabilization of a shock steady state for the inviscid Burgers equation.Mathematical Models and Methods in Applied Sciences.29 (2), 271–316, 2019.
7.G. Bastin, J.-M. Coron, A. Hayat and P. Shang, Boundary feedback stabilization of hydraulic jumps.IFAC Journal of System and Control7 100026, 10 pp, 2019.
8.S.X. Tang, J.X. Chu, P. Shang and J.-M. Coron, Asymptotic stability of a Korteweg-de Vries equation with a two-dimensional center manifold, Advances in Nonlinear Analysis,7(4),497-515,2018.
9.J.X. Chu, J.-M. Coron, P. Shang and S.X. Tang, Gevrey class regularity of a semigroup associated with a nonlinear Korteweg–de Vries equation,Chin. Ann. Math. Ser. B, 39(2),201-212, 2018.
10.M. Diagne, P. Shang and Z.Q. Wang, Well-posedness and the exact controllability of the mass balance equations for an extrusion process,Mathematical Methods in the Applied Sciences, 39, 2659-2670,2016.
11.J.X. Chu, J.-M. Coron and P. Shang, Asymptotic stability of a nonlinear Korteweg-de Vries equation with critical lengths,Journal of Differential Equations.259(8),4045-4085, 2015.
12.M. Diagne, P. Shang and Z.Q. Wang, Feedback stabilization for the mass balance equations of an extrusion process,IEEE Transactions on Automatic Control. 61(3),760-765, 2016.
13. M. Chyba, J.-M. Coron, P. Gabriel, A. Jacquemard, G. Patterson, G. Picot and P. Shang, Optimal Geometric Control Applied to the Protein Misfolding Cyclic Amplification Process.Acta Applicandae Mathematicae. 135, 145-173,2015.
14. M. Diagne, P. Shang and Z.Q. Wang,Feedback Stabilization of a Food Extrusion Process Described by 1D PDEs Defined on Coupled Time-Varying Spatial Domains,12th IFAC Workshop on Time Delay Systems, June 28-30, 2015 Ann Arbor, MI, USA.51-56, 2015.
15. J.-M. Coron, P. Gabriel and P. Shang, Optimization of an amplification protocol for misfolded proteins by using relaxed control,Journal of Mathematical Biology. 70(1), 289-327,2015.
16. P. Shang, Cauchy problem for multiscale conservation laws: Application to structured cell populations,Journal of Mathematical Analysis and Applications. 401(2), 896-920,2013.
17.F. Clement, J.-M. Coron and P. Shang, Optimal control of cell mass and maturity in a multiscale model of follicular ovulation,SIAM Journal on Control and Optimization. 51(2), 824–847,2013.
18. P. Shang, Z.Q. Wang, Analysis and control of a scalar conservation law modeling a highly re-entrant manufacturing system,Journal of Differential Equations. 250(2), No. 2, 949-982,2011.
19. P. Shang and K.L. Zhuang, Exact observability for second order quasilinear hyperbolic equations.Chinese Journal of Engineering Mathematics. 26(4), 618-636, 2009.
20. K.L. Zhuang and P. Shang, Exact controllability for second order quasilinear hyperbolic equations.Chinese Journal of Engineering Mathematics. 26(6), 1005-1020, 2009.
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