M
M Maarten Steinbuch
Researcher at Eindhoven University of Technology
Publications - 631
Citations - 13231
M Maarten Steinbuch is an academic researcher from Eindhoven University of Technology. The author has contributed to research in topics: Control theory & Robust control. The author has an hindex of 51, co-authored 630 publications receiving 11892 citations. Previous affiliations of M Maarten Steinbuch include Nanyang Technological University & Delft University of Technology.
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String-Stable CACC Design and Experimental Validation: A Frequency-Domain Approach
TL;DR: Implementation of the CACC system, the string-stability characteristics of the practical setup, and experimental results are discussed, indicating the advantages of the design over standard adaptive-cruise-control functionality.
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Energy management strategies for vehicular electric power systems
Mwt Michiel Koot,J.T.B.A. Kessels,B. de Jager,Wpmh Maurice Heemels,P.P.J. van den Bosch,M Maarten Steinbuch +5 more
TL;DR: An extensive study on controlling the vehicular electric power system to reduce the fuel use and emissions, by generating and storing electrical energy only at the most suitable moments is presented.
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Plasma needle for in vivo medical treatment: recent developments and perspectives
Eva Stoffels,I.E. Kieft,R.E.J. Sladek,L J M van den Bedem,E.P. van der Laan,M Maarten Steinbuch +5 more
TL;DR: The hitherto unravelled facts on the interactions of a cold atmospheric plasma with living cells and tissues are described.
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Brief Repetitive control for systems with uncertain period-time
TL;DR: A robust repetitive controller structure is proposed that uses multiple memory-loops in a certain feedback configuration, such that small changes in period-time do not diminish the disturbance rejection properties.
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A fast algorithm to computer the H ∞ -norm of a transfer function matrix
TL;DR: A very simple method to compute a rather close lower bound on the H ∞ - norm, based on the relation between the singular values of the transfer function matrix and the eigenvalues of a related Hamiltonian matrix.