Image Segmentation by Convex Quadratic Programming

被引:0
|
作者
Rivera, Mariano
Dalmau, Oscar
Tago, Josue
机构
来源
19TH INTERNATIONAL CONFERENCE ON PATTERN RECOGNITION, VOLS 1-6 | 2008年
关键词
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
A quadratic programming formulation for multiclass image segmentation is investigated. It is proved that, in the convex case, the non-negativity constraint on the recent reported Quadratic Markov Measure Field model can be neglected and the solution preserves the probability measure property. This allows one to design efficient optimization algorithms. Additionally, it is proposed a (free parameter) inter-pixel affinity measure which is more related with classes memberships than with color or gray gradient based standard methods. Moreover it is introduced a formulation for computing the pixel likelihoods by taking into account local context and texture properties.
引用
收藏
页码:704 / 708
页数:5
相关论文
共 50 条
  • [31] Some randomized algorithms for convex quadratic programming
    Goldbach, R
    [J]. APPLIED MATHEMATICS AND OPTIMIZATION, 1999, 39 (01): : 121 - 142
  • [32] Designing Camera Networks by Convex Quadratic Programming
    Ghanem, Bernard
    Cao, Yuanhao
    Wonka, Peter
    [J]. COMPUTER GRAPHICS FORUM, 2015, 34 (02) : 69 - 80
  • [33] ELLIPSOID BOUNDS FOR CONVEX QUADRATIC INTEGER PROGRAMMING
    Buchheim, Christoph
    Huebner, Ruth
    Schoebel, Anita
    [J]. SIAM JOURNAL ON OPTIMIZATION, 2015, 25 (02) : 741 - 769
  • [34] Fractional programming with convex quadratic forms and functions
    Benson, HP
    [J]. EUROPEAN JOURNAL OF OPERATIONAL RESEARCH, 2006, 173 (02) : 351 - 369
  • [35] Convex non-convex image segmentation
    Chan, Raymond
    Lanza, Alessandro
    Morigi, Serena
    Sgallari, Fiorella
    [J]. NUMERISCHE MATHEMATIK, 2018, 138 (03) : 635 - 680
  • [36] Quadratic convex reformulation for quadratic programming with linear on-off constraints
    Wu, Baiyi
    Li, Duan
    Jiang, Rujun
    [J]. EUROPEAN JOURNAL OF OPERATIONAL RESEARCH, 2019, 274 (03) : 824 - 836
  • [37] Solving convex quadratic bilevel programming problems using an enumeration sequential quadratic programming algorithm
    Jean Bosco Etoa Etoa
    [J]. Journal of Global Optimization, 2010, 47 : 615 - 637
  • [38] Solving convex quadratic bilevel programming problems using an enumeration sequential quadratic programming algorithm
    Etoa, Jean Bosco Etoa
    [J]. JOURNAL OF GLOBAL OPTIMIZATION, 2010, 47 (04) : 615 - 637
  • [39] Solving quadratic assignment problems using convex quadratic programming relaxations
    Brixius, NW
    Anstreicher, KM
    [J]. OPTIMIZATION METHODS & SOFTWARE, 2001, 16 (1-4): : 49 - 68
  • [40] A new bound for the quadratic assignment problem based on convex quadratic programming
    Kurt M. Anstreicher
    Nathan W. Brixius
    [J]. Mathematical Programming, 2001, 89 : 341 - 357
12345