论文信息 - Finding the best set of K paths through a trellis with application to multitarget tracking

Finding the best set of K paths through a trellis with application to multitarget tracking

A solution is presented to the problem of finding the best set of K completely unmerged paths through a trellis with M/sub /i>or=K states at depth i in the trellis, i=0, 1, 2, . . ., N. Here, 'best set' means that the sum of the metrics of all K paths in the set is minimized, and 'completely unmerged' means that no two paths pass through a common state. The solution involves using the Viterbi algorithm on an expanded trellis. This result is then used to separate the tracks of K targets optimally in a simplified model of a multitarget radar system. The model includes measurement errors and false alarms, but it does not include the effects of missing detections or merged measurements. >

[1] Chaw-Bing Chang,et al. Application of state estimation to target tracking , 1984 .

[2] C. Morefield. Application of 0-1 integer programming to multitarget tracking problems , 1977 .

[3] S. Mori,et al. Tracking and classifying multiple targets without a priori identification , 1986 .

[4] Kuo-Chu Chang,et al. Joint probabilistic data association for multitarget tracking with possibly unresolved measurements and maneuvers , 1984 .

[5] Kim B. Housewright,et al. Derivation and evaluation of improved tracking filter for use in dense multitarget environments , 1974, IEEE Trans. Inf. Theory.

[6] Andrew J. Viterbi,et al. Convolutional Codes and Their Performance in Communication Systems , 1971 .

[7] Donald Reid. An algorithm for tracking multiple targets , 1978 .

[8] Yair Barniv,et al. Dynamic Programming Solution for Detecting Dim Moving Targets , 1985, IEEE Transactions on Aerospace and Electronic Systems.

[9] Yaakov Bar-Shalom,et al. Tracking methods in a multitarget environment , 1978 .

[10] Andrew J. Viterbi,et al. Error bounds for convolutional codes and an asymptotically optimum decoding algorithm , 1967, IEEE Trans. Inf. Theory.

[11] Jr. G. Forney,et al. The viterbi algorithm , 1973 .