ON THE BENEFITS OF SUBSPACE DIMENSION REDUCTION FOR GRASSMANNIAN MULTIUSER BEAMFORMERS

被引:0
|
作者
Xiong, Zhilan [1 ]
Cumanan, Kanapathippillai [1 ]
Lambotharan, Sangarapillai [1 ]
机构
[1] Univ Loughborough, Adv Signal Proc Grp, Loughborough LE11 3TU, Leics, England
来源
2009 IEEE/SP 15TH WORKSHOP ON STATISTICAL SIGNAL PROCESSING, VOLS 1 AND 2 | 2009年
关键词
Block diagonalization; MIMO; multiuser; limited-feedback; Grassmannian codebook; MIMO BROADCAST CHANNELS; LIMITED FEEDBACK; BLOCK DIAGONALIZATION;
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
Block diagonalization (BD) is a linear precoding technique to eliminate inter-user interference (IUI) in multiple-input multiple-output (MIMO) multiuser wireless communication systems. In this paper, a limited feedback-based BD algorithm with Grassmannian codebook is studied. When the number of bits available for feeding back channel state information (CST) from multiple terminals to the basestation (BS) is limited, we demonstrate feeding back singular vector corresponding to the largest singular value provides a better capacity performance as compared to feeding back the whole signal subspace.
引用
收藏
页码:657 / 660
页数:4
相关论文
共 50 条
  • [1] Robust dimension reduction, fusion frames, and Grassmannian packings
    Kutyniok, Gitta
    Pezeshki, Ali
    Calderbank, Robert
    Liu, Taotao
    APPLIED AND COMPUTATIONAL HARMONIC ANALYSIS, 2009, 26 (01) : 64 - 76
  • [2] Subspace Estimation with Automatic Dimension and Variable Selection in Sufficient Dimension Reduction
    Zeng, Jing
    Mai, Qing
    Zhang, Xin
    JOURNAL OF THE AMERICAN STATISTICAL ASSOCIATION, 2024, 119 (545) : 343 - 355
  • [3] Subspace Tracking with Dynamical Models on the Grassmannian
    Saad-Falcon, Alex
    Ancelin, Brighton
    Romberg, Justin
    2024 IEEE 13RD SENSOR ARRAY AND MULTICHANNEL SIGNAL PROCESSING WORKSHOP, SAM 2024, 2024,
  • [4] Approximate Grassmannian Intersections: Subspace-Valued Subspace Learning
    Murdock, Calvin
    De la Torre, Fernando
    2017 IEEE INTERNATIONAL CONFERENCE ON COMPUTER VISION (ICCV), 2017, : 4318 - 4326
  • [5] Subspace segmentation with outliers: a Grassmannian approach to the maximum consensus subspace
    da Silva, Nuno Pinho
    Costeira, Joao Paulo
    2008 IEEE CONFERENCE ON COMPUTER VISION AND PATTERN RECOGNITION, VOLS 1-12, 2008, : 962 - 967
  • [6] A Shrinkage Estimation of Central Subspace in Sufficient Dimension Reduction
    Wang, Qin
    COMMUNICATIONS IN STATISTICS-SIMULATION AND COMPUTATION, 2010, 39 (10) : 1868 - 1876
  • [7] Sampling-Based Dimension Reduction for Subspace Approximation
    Deshpande, Amit
    Varadarajan, Kasturi
    STOC 07: PROCEEDINGS OF THE 39TH ANNUAL ACM SYMPOSIUM ON THEORY OF COMPUTING, 2007, : 641 - 650
  • [8] Linear Subspace Learning via Sparse Dimension Reduction
    Yin, Ming
    Guo, Yi
    Gao, Junbin
    PROCEEDINGS OF THE 2014 INTERNATIONAL JOINT CONFERENCE ON NEURAL NETWORKS (IJCNN), 2014, : 3540 - 3547
  • [9] Sufficient dimension reduction through informative predictor subspace
    Yoo, Jae Keun
    STATISTICS, 2016, 50 (05) : 1086 - 1099
  • [10] Fused Estimators of the Central Subspace in Sufficient Dimension Reduction
    Cook, R. Dennis
    Zhang, Xin
    JOURNAL OF THE AMERICAN STATISTICAL ASSOCIATION, 2014, 109 (506) : 815 - 827
12345