Network localization with noisy distances by non-convex optimization

被引:0
|
作者
Saha, A. [1 ]
Sau, B. [1 ]
机构
[1] Jadavpur Univ, Dept Math, Kolkata, India
来源
PROCEEDINGS OF THE 2016 IEEE INTERNATIONAL CONFERENCE ON WIRELESS COMMUNICATIONS, SIGNAL PROCESSING AND NETWORKING (WISPNET) | 2016年
关键词
Network localization; non-convex optimization; localization with noisy distances; Lagrange optimization in application;
D O I
暂无
中图分类号
TM [电工技术]; TN [电子技术、通信技术];
学科分类号
0808 ; 0809 ;
摘要
A distance based network localization determines the positions of the nodes in the network subject to some distance constraints. The network localization problem may be modeled as a non-convex nonlinear optimization problem with distance constraints which are either convex or non-convex. Existing network localization algorithms either eliminate the non-convex distance constraints or relax them into convex constraints to employ the traditional convex optimization methods, e.g., SDP, for estimating positions of nodes with noisy distances. In practice, the estimated solution of such a converted problem gives errors due to the modification of constraints. In this paper, we employ the nonlinear Lagrangian method for non-convex optimization which efficiently estimates node positions solving the original network localization problem without any modification. The proposed method involves numerical computations. By increasing the number of iterations (not very high, usually less than hundred) in computations, a desired level of accuracy may be achieved.
引用
收藏
页码:704 / 708
页数:5
相关论文
共 50 条
  • [1] Network localization by non-convex optimization
    Saha, Ananya
    Sau, Buddhadeb
    [J]. MOBIMWAREHN'17: PROCEEDINGS OF THE 7TH ACM WORKSHOP ON MOBILITY, INTERFERENCE, AND MIDDLEWARE MANAGEMENT IN HETNETS, 2017,
  • [2] Non-convex Optimization in Connectivity-based Sensor Network Localization
    Qiao Dapeng
    [J]. 2014 33RD CHINESE CONTROL CONFERENCE (CCC), 2014, : 365 - 370
  • [3] Localization and Approximations for Distributed Non-convex Optimization
    Hsu Kao
    Vijay Subramanian
    [J]. Journal of Optimization Theory and Applications, 2024, 200 : 463 - 500
  • [4] Localization and Approximations for Distributed Non-convex Optimization
    Kao, Hsu
    Subramanian, Vijay
    [J]. JOURNAL OF OPTIMIZATION THEORY AND APPLICATIONS, 2024, 200 (02) : 463 - 500
  • [5] Beyond Convex Relaxation: A Polynomial-Time Non-Convex Optimization Approach to Network Localization
    Ji, Senshan
    Sze, Kam-Fung
    Zhou, Zirui
    So, Anthony Man-Cho
    Ye, Yinyu
    [J]. 2013 PROCEEDINGS IEEE INFOCOM, 2013, : 2499 - 2507
  • [6] Hybrid Initialization for Non-convex Network Localization Problems
    Macagnano, Davide
    Destino, Giuseppe
    de Abreu, Giuseppe Thadeu Freitas
    [J]. 2011 IEEE INTERNATIONAL CONFERENCE ON ULTRA-WIDEBAND (ICUWB), 2011, : 145 - 149
  • [7] Stochastic Network Optimization with Non-Convex Utilities and Costs
    Neely, Michael J.
    [J]. 2010 INFORMATION THEORY AND APPLICATIONS WORKSHOP (ITA), 2010, : 352 - 361
  • [8] Non-convex model for sensor network localization based on connectivity
    Qiao, Dapeng
    Pang, Grantham K. H.
    [J]. WIRELESS COMMUNICATIONS & MOBILE COMPUTING, 2014, 14 (09): : 865 - 876
  • [9] Improved Time of Arrival Measurement Model for Non-Convex Optimization with Noisy Data
    Sidorenko, Juri
    Schatz, Volker
    Scherer-Negenborn, Norbert
    Arens, Michael
    Hugentobler, Urs
    [J]. 2018 NINTH INTERNATIONAL CONFERENCE ON INDOOR POSITIONING AND INDOOR NAVIGATION (IPIN 2018), 2018,
  • [10] Non-Convex Optimization: A Review
    Trehan, Dhruv
    [J]. PROCEEDINGS OF THE INTERNATIONAL CONFERENCE ON INTELLIGENT COMPUTING AND CONTROL SYSTEMS (ICICCS 2020), 2020, : 418 - 423
12345