Conditions for Guaranteed Convergence in Sensor and Source Localization
Date
2007
Authors
Fidan, Baris
Dasgupta, Soura
Anderson, Brian
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Volume Title
Publisher
Institute of Electrical and Electronics Engineers (IEEE Inc)
Abstract
This paper considers localization of a source or a sensor from distance measurements. We argue that linear algorithms proposed for this purpose are susceptible to poor noise performance. Instead given a set of sensors/anchors of known positions and measured distances of the source/sensor to be localized from them we propose a potentially nonconvex weighted cost function whose global minimum estimates the location of the source/sensor one seeks. The contribution of this paper is to provide nontrivial ellipsoidal and polytopic regions surrounding these sensors/anchors of known positions, such that if the object to be localized is in this region localization occurs by globally convergent gradient descent. This has implication to the deployment of sensors/anchors to achieve a desired level of geographical coverage.
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Keywords
Keywords: Algorithms; Convergence of numerical methods; Distance measurement; Frequency estimation; Optimization; Signal noise measurement; Global convergence; Gradient descent; Nonconvex weighted costs; Source localization; Sensor networks Global convergence; Gradient descent; Localization; Optimization; Sensors
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Source
Proceedings of the 2007 IEEE International Conference on Acoustics, Speech, and Signal Processing
Type
Conference paper
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Restricted until
2037-12-31
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