ISS estimates in the spatial sup-norm for nonlinear 1-D parabolic PDEs

In this paper, we introduce the notion of relative K-equi-stability (RKES) to characterize the uniformly continuous dependence of (weak) solutions on external disturbances for nonlinear parabolic PDE systems. Based on the RKES, we prove the input-to-state stability (ISS) in the spatial sup-norm for a class of nonlinear parabolic PDEs with either Dirichlet or Robin boundary disturbances. An example concerned with a super-linear parabolic PDE with Robin boundary condition is provided to illustrate the obtained ISS results. Besides, as an application of the notion of RKES, we conduct stability analysis for a class of parabolic PDEs in cascade coupled over the domain or on the boundary of the domain, in the spatial and time sup-norm, and in the spatial sup-norm, respectively. The technique of De Giorgi iteration is extensively used in the proof of the results presented in this paper.

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Global ISS for the Viscous Burgers' Equation With Dirichlet Boundary Disturbances

Zheng,

Zhu

2024

IEEE Trans. Automat. Contr.

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ISS estimates in the spatial sup-norm for nonlinear 1-D parabolic PDEs

Cited by 4 publications

References 30 publications

Input-to-state stability and integral input-to-state stability in various norms for 1-D nonlinear parabolic PDEs

Input-to-state stability and integral input-to-state stability in various norms for 1-D nonlinear parabolic PDEs

Relative Stability in the Sup-Norm and Input-to-State Stability in the Spatial Sup-Norm for Parabolic PDEs

Global ISS for the Viscous Burgers' Equation With Dirichlet Boundary Disturbances

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