Many large-scale systems have inherent structures that can be exploited to facilitate their analysis and design. This thesis investigates how chordal graph properties can be used to develop scalable methods for solving three classes of problems: sparse semidefinite programs (SDPs), distributed control of networked systems, and sum-of-squares (SOS) programs. By exploiting the properties of chordal graphs and sparse positive semidefinite matrices, we present decomposition methods that are able to scale these problems to much larger instances. The first part of this thesis proposes a new conversion framework for large-scale SDPs characterized by chordal sparsity. This framework is analogous to standard conversion techniques for interior-poin...
This paper considers the problem of designing static feedback gains subject to a priori structural c...
Abstract — Analysis questions in control theory are often formulated as Linear Matrix Inequalities a...
International audienceThis work is a follow-up and a complement to arXiv:1912.08899 [math.OC] for so...
Many large-scale systems have inherent structures that can be exploited to facilitate their analysis...
In this thesis we investigate how the properties of chordal graphs can be used to exploit sparsity i...
Many problems in control theory can be formulated as semidefinite programs (SDPs). For large-scale S...
Chordal and factor-width decomposition methods for semidefinite programming and polynomial optimizat...
This paper introduces a chordal decomposition approach for scalable analysis of linear networked sys...
We propose a distributed design method for decentralized control by exploiting the underlying sparsi...
We propose a distributed design method for decentralized control by exploiting the underlying sparsi...
Many semidefinite programs (SDPs) arising in practical applications have useful structural propertie...
We consider the problem of designing static feedback gains subject to a priori structural constraint...
Analysis questions in control theory are often formulated as Linear Matrix Inequalities and solved u...
Sparsity and parallel algorithms: two approaches to beat the curse of dimensionality. By Peter Benne...
We employ chordal decomposition to reformulate a large and sparse semidefinite program (SDP), either...
This paper considers the problem of designing static feedback gains subject to a priori structural c...
Abstract — Analysis questions in control theory are often formulated as Linear Matrix Inequalities a...
International audienceThis work is a follow-up and a complement to arXiv:1912.08899 [math.OC] for so...
Many large-scale systems have inherent structures that can be exploited to facilitate their analysis...
In this thesis we investigate how the properties of chordal graphs can be used to exploit sparsity i...
Many problems in control theory can be formulated as semidefinite programs (SDPs). For large-scale S...
Chordal and factor-width decomposition methods for semidefinite programming and polynomial optimizat...
This paper introduces a chordal decomposition approach for scalable analysis of linear networked sys...
We propose a distributed design method for decentralized control by exploiting the underlying sparsi...
We propose a distributed design method for decentralized control by exploiting the underlying sparsi...
Many semidefinite programs (SDPs) arising in practical applications have useful structural propertie...
We consider the problem of designing static feedback gains subject to a priori structural constraint...
Analysis questions in control theory are often formulated as Linear Matrix Inequalities and solved u...
Sparsity and parallel algorithms: two approaches to beat the curse of dimensionality. By Peter Benne...
We employ chordal decomposition to reformulate a large and sparse semidefinite program (SDP), either...
This paper considers the problem of designing static feedback gains subject to a priori structural c...
Abstract — Analysis questions in control theory are often formulated as Linear Matrix Inequalities a...
International audienceThis work is a follow-up and a complement to arXiv:1912.08899 [math.OC] for so...