• Title of article

    Complexity analysis of interior-point methods yielding the best known iteration bound for semidefinite optimization

  • Author/Authors

    Louiza ، Derbal Fundamental and Numerical Mathematics Laboratory, Department of Mathematics - Faculty of Science - Ferhat Abbas University , Zakia ، Kebbiche Fundamental and Numerical Mathematics Laboratory, Department of Mathematics - Faculty of Science - Ferhat Abbas University , Mousaab ، Bouafia University of 8 May 1945 Guelma

  • From page
    287
  • To page
    301
  • Abstract
    The purpose of this paper is to obtain new complexity results for solving the semidefinite optimization (SDO) problem. We define a new proximity function for the SDO by a new kernel function with an efficient logarithmic barrier term. Furthermore, we formulate an algorithm for the large and small-update primal-dual interior-point method (IPM) for the SDO. It is shown that the best result of iteration bounds for large-update methods and small-update methods can be achieved, namely O ( qn q+1 2q log n ϵ ) for large-update and O(q2√ n log n ϵ ) for small-update methods, where q 1. The analysis in this paper is new and different from the one using for LO. Several new tools and techniques are derived in this paper. Furthermore, numerical tests to investigate the behavior of the algorithm so as to be compared with other approaches.
  • Keywords
    Kernel function , Proximity function , Semidefinite optimization , Complexity analysis , Primal , dual interior , point methods
  • Journal title
    International Journal of Nonlinear Analysis and Applications
  • Journal title
    International Journal of Nonlinear Analysis and Applications
  • Record number

    2773493