AbstractA fundamental problem in control systems theory is finding a reduced order model that is optimal in the L2 sense to a given (full order) system model. The numerical solution of this problem is challenging and the global convergence properties of homotopy methods are advantageous. A number of homotopy-based approaches have been developed. The primary numerical issues are the number of degrees of freedom in the homotopy parameter vector, the well-posedness of the finite-dimensional optimization problem, and the numerical robustness of the resulting homotopy algorithm. This paper develops two new homotopy algorithms for optimal model reduction and uses several examples to compare their performance with the performance of two previous a...
In order to solve partial differential equations numerically and accurately, a high order spatial di...
AbstractThe optimal projection approach to solving the H2 reduced order model problem produces two c...
Peer Reviewedhttp://deepblue.lib.umich.edu/bitstream/2027.42/57877/1/OptimalProjRedOrderModeling1985...
In control system analysis and design, finding a reduced order model, optimal in the L-squared sense...
The problem of finding a reduced order model, optimal in the H-squared sense, to a given system mode...
The optimal projection approach to solving the H2 reduced order model problem produces two coupled, ...
The linear-quadratic-gaussian (LQG) compensator was developed to facilitate the design of control la...
We develop a unifying framework for interpolatory $\mathcal{L}_2$-optimal reduced-order modeling for...
This paper deals with the problem of computing an La-optimal reduced-order model for a given stable ...
The optimization and control of systems governed by partial differential equations (PDEs) usually re...
In this paper, we investigate a time-limited $H_2$-model order reduction method for linear dynamical...
A model reduction method for stable delay systems under L2 optimality is introduced in this paper. T...
This paper is concerned with computing an L 2-optimal reduced-order model for a given stable multiva...
The problem of model reduction covers a wide spectrum of methodologies and applications. In view of ...
Estimation of the optimal order of reduced models in existing macromodeling techniques is a challeng...
In order to solve partial differential equations numerically and accurately, a high order spatial di...
AbstractThe optimal projection approach to solving the H2 reduced order model problem produces two c...
Peer Reviewedhttp://deepblue.lib.umich.edu/bitstream/2027.42/57877/1/OptimalProjRedOrderModeling1985...
In control system analysis and design, finding a reduced order model, optimal in the L-squared sense...
The problem of finding a reduced order model, optimal in the H-squared sense, to a given system mode...
The optimal projection approach to solving the H2 reduced order model problem produces two coupled, ...
The linear-quadratic-gaussian (LQG) compensator was developed to facilitate the design of control la...
We develop a unifying framework for interpolatory $\mathcal{L}_2$-optimal reduced-order modeling for...
This paper deals with the problem of computing an La-optimal reduced-order model for a given stable ...
The optimization and control of systems governed by partial differential equations (PDEs) usually re...
In this paper, we investigate a time-limited $H_2$-model order reduction method for linear dynamical...
A model reduction method for stable delay systems under L2 optimality is introduced in this paper. T...
This paper is concerned with computing an L 2-optimal reduced-order model for a given stable multiva...
The problem of model reduction covers a wide spectrum of methodologies and applications. In view of ...
Estimation of the optimal order of reduced models in existing macromodeling techniques is a challeng...
In order to solve partial differential equations numerically and accurately, a high order spatial di...
AbstractThe optimal projection approach to solving the H2 reduced order model problem produces two c...
Peer Reviewedhttp://deepblue.lib.umich.edu/bitstream/2027.42/57877/1/OptimalProjRedOrderModeling1985...