A method for reducing controllers for systems described by partial differential equations (PDEs) is applied to Burgers' equation with periodic boundary conditions. This approach differs from the typical approach of reducing the model and then designing the controller, and has developed over the past several years into its current form. In earlier work it was shown that functional gains for the feedback control law served well as a dataset for reduced order basis generation via the proper orthogonal decomposition (POD). However, the test problem was the two-dimensional heat equation, a problem in which the physics dominates the system in such a way that controller efficacy is difficult to generalize. Here, we additionally incorporate a nonli...
A stabilization problem for Burgers' equation is considered. Using linearization, various controller...
Abstract—We consider the problem of stabilization of unstable “shock-like ” equilibrium profiles of ...
Real-time applications of control require the ability to accurately and efficiently model the observ...
Obtaining a representative model in feedback control system design problems is a key step and is gen...
The reduced-order model of the optimal control problem governed by Burgers equation is derived using...
The two-dimensional Burgers equation is used as a surrogate for the governing equations to test orde...
The model-order reduction techniques Proper Orthogonal Decomposition (POD) and Discrete Empirical In...
ABSTRACT. In this article, we study a reduced-order modelling for distributed feedback con-trol prob...
AbstractA new approach for solving finite-time horizon feedback control problems for distributed par...
Modelling and boundary control for the Burgers equation is studied in this paper. Modelling has been...
Modeling and boundary control for Burgers Equation is studied in this paper. Modeling has been done ...
In this paper we consider the p)roblem of using reduced order dynamic com-pensators to control a cla...
In this paper, we study the stabilization of a two-dimensional Burgers equation around a stationary ...
Abstract — Modeling and boundary control for Burgers Equa-tion is studied in this paper. Modeling ha...
The 2D Burgers equation has extensively been considered as a benchmark problem by flow control resea...
A stabilization problem for Burgers' equation is considered. Using linearization, various controller...
Abstract—We consider the problem of stabilization of unstable “shock-like ” equilibrium profiles of ...
Real-time applications of control require the ability to accurately and efficiently model the observ...
Obtaining a representative model in feedback control system design problems is a key step and is gen...
The reduced-order model of the optimal control problem governed by Burgers equation is derived using...
The two-dimensional Burgers equation is used as a surrogate for the governing equations to test orde...
The model-order reduction techniques Proper Orthogonal Decomposition (POD) and Discrete Empirical In...
ABSTRACT. In this article, we study a reduced-order modelling for distributed feedback con-trol prob...
AbstractA new approach for solving finite-time horizon feedback control problems for distributed par...
Modelling and boundary control for the Burgers equation is studied in this paper. Modelling has been...
Modeling and boundary control for Burgers Equation is studied in this paper. Modeling has been done ...
In this paper we consider the p)roblem of using reduced order dynamic com-pensators to control a cla...
In this paper, we study the stabilization of a two-dimensional Burgers equation around a stationary ...
Abstract — Modeling and boundary control for Burgers Equa-tion is studied in this paper. Modeling ha...
The 2D Burgers equation has extensively been considered as a benchmark problem by flow control resea...
A stabilization problem for Burgers' equation is considered. Using linearization, various controller...
Abstract—We consider the problem of stabilization of unstable “shock-like ” equilibrium profiles of ...
Real-time applications of control require the ability to accurately and efficiently model the observ...