Determination of target motion rate using triangulation method in the conditions of prior uncertainty
DOI:
https://doi.org/10.3103/S0735272708110113Abstract
In the regularized definition the problem of estimating the target motion rate on the basis of a passive angle-measuring system in the conditions of prior uncertainty, characterized by the absence of information on measurement errors’ distribution laws, is solved.
References
Yu. G. Bulychov, I. V. Burlay, and Ya. V. Kritskiy, “Linear Variant of Solving the Triangulation Problem in the Conditions of Prior Uncertainty,” Radioelectron. Commun. Syst. 44(3), 48 (2001).
I. N. Bronshtein and K. A. Semend’ayev, Handbook on Mathematics (Nauka, Moscow, 1980) [in Russian].
B. F. Zhdanyuk, Basics of Statistical Processing of Trajectory Measurements (Sov. Radio, Moscow, 1978) [in Russian].
A. N. Tikhonov and M. V. Ufimtsev, Statistical Processing of Experimental Results (MSU, Moscow, 1988) [in Russian].
Yu. G. Bulychov and A. P. Manin, Mathematical Aspects of Determining the Motion of Flying Objects (Mashinostroyeniye, Moscow, 2000) [in Russian].
Ya. D. Shirman, V. N. Golikov, and I. N. Busygin, Theoretical Basics of Radars (Sov. Radio, Moscow, 1970) [in Russian, ed. by Ya. D. Shirman].
Yu. V. Bolotin, “Generalized Method of Least Squares in the Problem of Estimation Using Angle Measurements,” A&T, No. 2, 65 (1997).
Ye. N. Gil’bo and I. B. Cherpanov, Signal Processing on the Basis of Ordered Selection (Sov. Radio, Moscow, 1975) [in Russian].
А.А. Samarskii and А. V. Gulin, Numerical Methods (Nauka, Moscow, 1989) [in Russian].
