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Brian D. O. Anderson
Researcher at Australian National University
Publications - 1120
Citations - 50069
Brian D. O. Anderson is an academic researcher from Australian National University. The author has contributed to research in topics: Linear system & Control theory. The author has an hindex of 96, co-authored 1107 publications receiving 47104 citations. Previous affiliations of Brian D. O. Anderson include University of Newcastle & Eindhoven University of Technology.
Papers
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Journal ArticleDOI
Output feedback stabilization—Solution by algebraic geometry methods
Brian D. O. Anderson,R.W. Scott +1 more
TL;DR: In this article, the existence of a memoryless feedback law stabilizing the system is linked to a real solution of a set of multivariable polynomial inequalities, and the property that there is a finite number of solutions is established.
Proceedings ArticleDOI
WSN06-4: Online Calibration of Path Loss Exponent in Wireless Sensor Networks
TL;DR: This paper proposes a novel technique for online calibration of the path loss exponent in wireless sensor networks without using distance measurements and demonstrates that it is possible to estimate the PLE using only power measurements and the geometric constraints associated with planarity in a sensor network.
Journal ArticleDOI
Output-Nulling Invariant and Controllability Subspaces
TL;DR: In this paper, the output nulling invariant and controllability subspaces of a finite-dimensional linear system with a transfer function matrix that is not necessarily zero for infinite frequencies are studied.
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Recovery Times of Decision Feedback Equalizers on Noiseless Channels
TL;DR: It is argued that minimum phase or near minimum phase character for the channel does not necessarily guarantee short recovery time, and the space of channel parameters can accordingly be partitioned into a finite number of sets.
Journal ArticleDOI
A simple test for zeros of a complex polynomial in a sector
TL;DR: In this article, a simple proof of a recent result for determining whether the zeros of a real polynomial lie within a sector is given, and this result is used in a procedure given for confirming whether or not the zero of an arbitrary complex polynomials lie in a similar sector.