Howse, James W.; Ticknor, Lawrence O.; Muske, Kenneth R. Least squares estimation techniques for position tracking of radioactive sources. (English) Zbl 0978.93544 Automatica 37, No. 11, 1727-1737 (2001). Cited in 4 Documents MSC: 93E10 Estimation and detection in stochastic control theory 93C95 Application models in control theory Software:CFSQP PDF BibTeX XML Cite \textit{J. W. Howse} et al., Automatica 37, No. 11, 1727--1737 (2001; Zbl 0978.93544) Full Text: DOI References: [1] Bertsekas, D., Nonlinear programming, Optimization and neural computation series, (1999), Athena Scientific Belmont, MA [2] Bryson, A.; Ho, Y.-C., Applied optimal control: optimization, estimation, and control, (1975), Hemisphere Publishing Corp Bristol, PA [3] Conover, W., Practical nonparametric statistics, Applied probability and statistics series, (1980), Wiley New York, NY [4] Fletcher, R., Practical methods of optimization, (1987), Wiley Chichester, UK · Zbl 0905.65002 [5] Gotoh, H.; Yagi, H., Solid angle subtended by a rectangular slit, Nuclear instruments and methods, 96, 2, 485-486, (1971) [6] Hollander, M.; Wolfe, D., Nonparametric statistical methods, applied probability and statistics series, (1973), Wiley New York, NY [7] Jazwinski, A., Stochastic processes and filter theory, Mathematics in science and engineering, vol. 64, (1970), Academic Press, Inc New York, NY · Zbl 0203.50101 [8] Johnson, R.; Wichern, D., Applied multivariate statistical analysis, (1992), Prentice-Hall, Inc Englewood Cliffs, NJ · Zbl 0745.62050 [9] Lawrence, C.; Tits, A., Nonlinear equality constraints in feasible sequential quadratic programming, Optimization methods and software, 6, 2, 265-282, (1996) [10] Lawrence, C., Zhou, J., & Tits, A. (1994). User’s guide for CFSQP. Technical Report. TR-94-16r1, Institute for Systems Research, University of Maryland, College Park, MD. [11] Luenberger, D., Linear and nonlinear programming, (1984), Addison-Wesley Publishing Co., Inc Reading, MA [12] McCullagh, P.; Nelder, J., Generalized linear models, Statistics and applied probability, vol. 37, (1989), Chapman & Hall, Ltd London, UK · Zbl 0744.62098 [13] Muske, K., & Howse, J. (2001). Comparison of recursive estimation techniques for position tracking radioactive sources. Proceedings of the 2001 American control conference, American Automatic Control Council, to appear. · Zbl 0978.93544 [14] Muske, K., & Rawlings, J. (1995). Nonlinear moving horizon state estimation. In R. Berber (Ed.), Methods of model based process control (pp. 349-365). Dordrecht, Netherlands: Kluwer Academic Publishers. [15] Panier, E.; Tits, A., On combining feasibility, descent and superlinear convergence in inequality constrained optimization, Mathematical programming, 59, 2, 261-276, (1993) · Zbl 0794.90068 [16] Rao, C., & Rawlings, J. (2000). Nonlinear moving horizon estimation. In F. Allgöwer, & A. Zheng (Eds.), Nonlinear model predictive control, Progress in Systems and Control Theory, vol. 26 (pp. 45-69). Cambridge, MA: Birkhäuser. · Zbl 0967.93039 [17] Sage, A.; Melsa, J., Estimation theory with applications to communications and control, systems science series, (1971), McGraw-Hill, Inc New York, NY [18] Tsoulfanidis, N., Measurement and detection of radiation, nuclear engineering series, (1983), McGraw-Hill, Inc New York, NY This reference list is based on information provided by the publisher or from digital mathematics libraries. Its items are heuristically matched to zbMATH identifiers and may contain data conversion errors. It attempts to reflect the references listed in the original paper as accurately as possible without claiming the completeness or perfect precision of the matching.