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Richard H. Middleton
Researcher at University of Newcastle
Publications - 396
Citations - 13068
Richard H. Middleton is an academic researcher from University of Newcastle. The author has contributed to research in topics: Control theory & Linear system. The author has an hindex of 48, co-authored 393 publications receiving 12037 citations. Previous affiliations of Richard H. Middleton include Hamilton Institute & University of California.
Papers
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Proceedings ArticleDOI
A narrowband high frequency distributed power transformer model for partial discharge location
TL;DR: In this article, a narrow band high frequency distributed transformer model is used to estimate the location of partial discharge in a single phase of a 66 kV/25 MVA interleaved transformer winding.
Journal ArticleDOI
Scalability of Bidirectional Vehicle Strings with Measurement Errors
TL;DR: This paper examines the problem of poor scalability arises in many vehicle platoon problems and shows how information exchange between vehicles may eliminate scalability difficulties due to measurement errors.
Posted Content
Analysis of Attack via Grounding and Countermeasures in Discrete-Time Consensus Networks.
TL;DR: This paper investigates how the grounding affects the eigenratio of expander graph families that usually exhibit good scaling properties with increasing network size and shows that it will decrease due to the grounding causing the performance and scalability of the network to deteriorate, even to the point of losing consensusability.
Proceedings ArticleDOI
On-off based charging strategies for EVs connected to a Low Voltage distributon network
TL;DR: In this article, a distributed charging algorithm applicable to on-off based charging systems is presented, and a modified version of the algorithm is proposed to incorporate real power system constraints to compare with uncontrolled and centralized charging strategies from the perspective of both utilities and customers.
Proceedings ArticleDOI
A necessary and sufficient LMI condition for stability of 2D mixed continuous-discrete-time systems
TL;DR: A linear matrix inequality (LMI) condition is proposed that is sufficient for 2D exponential stability for any chosen degree of the Lyapunov function candidate and it is shown that this condition is also necessary for a sufficiently large degree.