Modelling and boundary control for the Burgers equation is studied in this paper. Modelling has been done via processing of numerical observations through proper orthogonal decomposition (POD) with Galerkin projection. This results in a set of spatial basis functions together with a set of ordinary differential equations (ODEs) describing the temporal evolution. Since the dynamics described by the Burgers equation are non-linear, the corresponding reduced-order dynamics turn out to be non-linear. The presented analysis explains how the free boundary condition appears as a control input in the ODEs and how controller design can be accomplished. The issues of control system synthesis are discussed from the point of practicality, performance a...
Real-time applications of control require the ability to accurately and efficiently model the observ...
Abstract—We consider the problem of stabilization of unstable “shock-like ” equilibrium profiles of ...
Although often referred to as a one-dimensional \cartoon " of Navier{Stokes equation because it...
Modeling and boundary control for Burgers Equation is studied in this paper. Modeling has been done ...
Abstract — Modeling and boundary control for Burgers Equa-tion is studied in this paper. Modeling ha...
Obtaining a representative model in feedback control system design problems is a key step and is gen...
A method for reducing controllers for systems described by partial differential equations (PDEs) is ...
The two-dimensional Burgers equation is used as a surrogate for the governing equations to test orde...
The 2D Burgers equation has extensively been considered as a benchmark problem by flow control resea...
I previously used Burgers' equation to introduce a new method of numerical discretisation of PDEs. T...
A stabilization problem for Burgers' equation is considered. Using linearization, various controller...
AbstractWe describe a methodology for solving boundary control problems for the viscous Burgers' equ...
AbstractIn this paper, the dynamics of the forced Burgers equation: ut=νuxx-uux+f(x), subject to bot...
summary:In this paper, we propose a novel algorithm for solving an optimal boundary control problem ...
dimensional modelling and Dirichlét boundary controller design for Burgers equatio
Real-time applications of control require the ability to accurately and efficiently model the observ...
Abstract—We consider the problem of stabilization of unstable “shock-like ” equilibrium profiles of ...
Although often referred to as a one-dimensional \cartoon " of Navier{Stokes equation because it...
Modeling and boundary control for Burgers Equation is studied in this paper. Modeling has been done ...
Abstract — Modeling and boundary control for Burgers Equa-tion is studied in this paper. Modeling ha...
Obtaining a representative model in feedback control system design problems is a key step and is gen...
A method for reducing controllers for systems described by partial differential equations (PDEs) is ...
The two-dimensional Burgers equation is used as a surrogate for the governing equations to test orde...
The 2D Burgers equation has extensively been considered as a benchmark problem by flow control resea...
I previously used Burgers' equation to introduce a new method of numerical discretisation of PDEs. T...
A stabilization problem for Burgers' equation is considered. Using linearization, various controller...
AbstractWe describe a methodology for solving boundary control problems for the viscous Burgers' equ...
AbstractIn this paper, the dynamics of the forced Burgers equation: ut=νuxx-uux+f(x), subject to bot...
summary:In this paper, we propose a novel algorithm for solving an optimal boundary control problem ...
dimensional modelling and Dirichlét boundary controller design for Burgers equatio
Real-time applications of control require the ability to accurately and efficiently model the observ...
Abstract—We consider the problem of stabilization of unstable “shock-like ” equilibrium profiles of ...
Although often referred to as a one-dimensional \cartoon " of Navier{Stokes equation because it...