J
Jie Chen
Researcher at Beihang University
Publications - 487
Citations - 12669
Jie Chen is an academic researcher from Beihang University. The author has contributed to research in topics: Synthetic aperture radar & Linear system. The author has an hindex of 44, co-authored 453 publications receiving 10931 citations. Previous affiliations of Jie Chen include South China University of Technology & Northeastern University.
Papers
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Journal ArticleDOI
Stabilization of TITO Systems over Parallel SNR-Constrained AWN channels
TL;DR: This paper concerns the stabilization of two-input two-output (TITO) discrete-time linear time-invariant (LTI) systems over parallel additive white noise channels, in which each individual channel is independently constrained in SNR.
Journal ArticleDOI
Output feedback stabilisation of single-input single-output linear systems with I/O network-induced delays. An eigenvalue-based approach
TL;DR: This work addresses the output feedback stabilisation problem for a class of linear single-input single-output systems subject to I/O network delays by characterisation of the set of delay and gain parameters guaranteeing the stability of the closed-loop system.
Posted Content
Fully Distributed Adaptive Output Feedback Protocols for Linear Multi-Agent Systems with Directed Graphs: A Sequential Observer Design Approach
TL;DR: This paper proposes a novel sequential observer design approach, which makes it possible to design fully distributed adaptive output feedback protocols that the existing methods fail to accomplish, and shows that leaderless consensus can be achieved for any strongly connected directed graph in a fully distributed manner.
Proceedings ArticleDOI
Multivariable gain-phase and sensitivity integrals
TL;DR: In this article, the authors present several extensions of the classical Bode integral relations to multivariable feedback systems, including an extended gain-phase integral formula and an extended sensitivity integral relation.
Proceedings ArticleDOI
Stability of linear neutral time-delay systems: exact conditions via matrix pencil solutions
TL;DR: The results extend previously known work on retarded systems, and demonstrate that similar stability tests exist for neutral systems; in particular, the tests require essentially the same amount of computation required for retarded systems.