Title :
Backstepping control of PDEs with time-varying domain
Author :
Izadi, Maziar ; Abdollahi, Javad ; Dubljevic, Stevan
Author_Institution :
Dept. of Chem. & Mater. Eng., Univ. of Alberta, Edmonton, AB, Canada
Abstract :
In this work a PDE backstepping-based control law for one-dimensional unstable heat equation with time-varying spatial domain is developed. The underlying parabolic partial differential equation (PDE) with time-varying domain is the model emerging from process control applications such as crystal growth. In backstepping control law synthesis, a characteristic feature is that the PDE describing the transformation kernel of the associated Volterra integral is time-dependent. In this work, the kernel PDE is solved numerically and the state-feedback controller is simulated for the application of temperature regulation in the Czochralski crystal growth process.
Keywords :
Volterra equations; chemical engineering; control system synthesis; crystal growth; partial differential equations; state feedback; temperature control; time-varying systems; Czochralski crystal growth process; PDE backstepping-based control law; Volterra integral; backstepping control law synthesis; crystal growth; one-dimensional unstable heat equation; parabolic partial differential equation; process control applications; state-feedback controller; temperature regulation; time-varying spatial domain; Approximation methods; Backstepping; Equations; Kernel; Mathematical model; Process control; Time-varying systems; Distributed parameter systems;
Conference_Titel :
American Control Conference (ACC), 2014
Conference_Location :
Portland, OR
Print_ISBN :
978-1-4799-3272-6
DOI :
10.1109/ACC.2014.6859213
