A closed-form solution for the probability hypothesis density filter

被引:0
|
作者
Vo, BN [1 ]
Ma, WK [1 ]
机构
[1] Univ Melbourne, Dept Elect & Elect Engn, Parkville, Vic 3010, Australia
来源
2005 7TH INTERNATIONAL CONFERENCE ON INFORMATION FUSION (FUSION), VOLS 1 AND 2 | 2005年
关键词
multi-target tracking; optimal filtering; point processes; random sets;
D O I
暂无
中图分类号
TP18 [人工智能理论];
学科分类号
081104 ; 0812 ; 0835 ; 1405 ;
摘要
The problem of dynamically estimating a timevarying set of targets can be cast as a filtering problem using the random finite set (or point process) framework. The probability hypothesis density (PHD) filter is a recursion that propagates the posterior intensity function-a 1st-order moment-of the random set of multiple targets in time. Like the Bayesian single-target filter the PHD recursion also suffers from the curse of dimensionality. Although sequential Monte Carlo implementations have demonstrated the potential of the PHD filter, so far no closed-form solutions have yet been developed. In this paper, an analytic solution to the PHD recursion is proposed for linear Gaussian target dynamics with Gaussian births. This result is analogous to the Kalman recursion in Bayesian single-target filtering. Extension to nonlinear dynamics is also discussed.
引用
收藏
页码:856 / 863
页数:8
相关论文
共 50 条
  • [21] The Spline Probability Hypothesis Density Filter
    Sithiravel, Rajiv
    Tharmarasa, Ratnasingham
    McDonald, Mike
    Pelletier, Michel
    Kirubarajan, Thiagalingam
    SIGNAL PROCESSING, SENSOR FUSION, AND TARGET RECOGNITION XXI, 2012, 8392
  • [22] Trajectory probability hypothesis density filter
    Garcia-Fernandez, Angel F.
    Svensson, Lennart
    2018 21ST INTERNATIONAL CONFERENCE ON INFORMATION FUSION (FUSION), 2018, : 1430 - 1437
  • [23] The Spline Probability Hypothesis Density Filter
    Sithiravel, Rajiv
    Chen, Xin
    Tharmarasa, Ratnasingham
    Balaji, Bhashyam
    Kirubarajan, Thiagalingam
    IEEE TRANSACTIONS ON SIGNAL PROCESSING, 2013, 61 (24) : 6188 - 6203
  • [24] Probability hypothesis density filter with uncertainty in the probability of detection
    Sanaga, Rohith Reddy
    Frueh, Carolin
    ADVANCES IN SPACE RESEARCH, 2021, 67 (05) : 1437 - 1453
  • [25] EXACT CLOSED-FORM OF THE RETURN PROBABILITY ON THE BETHE LATTICE
    GIACOMETTI, A
    JOURNAL OF PHYSICS A-MATHEMATICAL AND GENERAL, 1995, 28 (01): : L13 - L17
  • [26] CLOSED-FORM EXPRESSIONS FOR THE MOMENTS OF THE BINOMIAL PROBABILITY DISTRIBUTION
    Knoblauch, Andreas
    SIAM JOURNAL ON APPLIED MATHEMATICS, 2008, 69 (01) : 197 - 204
  • [27] CLOSED-FORM SOLUTION FOR OUTPUT OF A FINITE-BANDWIDTH PULSE-COMPRESSION FILTER
    DIFRANCO, J
    PROCEEDINGS OF THE INSTITUTE OF RADIO ENGINEERS, 1961, 49 (06): : 1086 - &
  • [28] A closed-form solution for the design of complex FIR filters and its application to filter banks
    Zhu, WP
    Ahmad, MO
    Swamy, MNS
    ISCAS '97 - PROCEEDINGS OF 1997 IEEE INTERNATIONAL SYMPOSIUM ON CIRCUITS AND SYSTEMS, VOLS I - IV: CIRCUITS AND SYSTEMS IN THE INFORMATION AGE, 1997, : 2224 - 2227
  • [29] MINIMIZATION OF DRILLING COSTS - A CLOSED-FORM SOLUTION
    SHAIKH, MA
    HANSOTIA, BJ
    COMPUTERS & INDUSTRIAL ENGINEERING, 1992, 23 (1-4) : 443 - 446
  • [30] PORTFOLIO CHOICE WITH JUMPS: A CLOSED-FORM SOLUTION
    Ait-Sahalia, Yacine
    Cacho-Diaz, Julio
    Hurd, T. R.
    ANNALS OF APPLIED PROBABILITY, 2009, 19 (02): : 556 - 584
12345