On duality principles and related convex dual formulations suitable for local and global non-convex variational optimization

被引:1
|
作者
Botelho, Fabio Silva [1 ]
机构
[1] Univ Fed Santa Catarina, Dept Math, Florianopolis, SC, Brazil
来源
NONLINEAR ENGINEERING - MODELING AND APPLICATION | 2023年 / 12卷 / 01期
关键词
convex dual variational formulations; duality principles for non-convex primal local and global optimization; Ginzburg-Landau type equation;
D O I
10.1515/nleng-2022-0343
中图分类号
TH [机械、仪表工业];
学科分类号
0802 ;
摘要
This article develops duality principles, a related convex dual formulation and primal dual formulations suitable for the local and global optimization of non convex primal formulations for a large class of models in physics and engineering. The results are based on standard tools of functional analysis, calculus of variations and duality theory. In particular, we develop applications to a Ginzburg-Landau type equation. Other applications include primal dual variational formulations for a Burger's type equation and a Navier-Stokes system. We emphasize the novelty here is that the first dual variational formulation developed is convex for a primal formulation which is originally non-convex. Finally, we also highlight the primal dual variational formulations presented have a large region of convexity around any of their critical points.
引用
收藏
页数:15
相关论文
共 50 条
  • [41] Global optimization method with dual Lipschitz constant estimates for problems with non-convex constraints
    Strongin, Roman
    Barkalov, Konstantin
    Bevzuk, Semen
    SOFT COMPUTING, 2020, 24 (16) : 11853 - 11865
  • [42] Non-convex self-dual Lagrangians: New variational principles of symmetric boundary value problems
    Moameni, Abbas
    JOURNAL OF FUNCTIONAL ANALYSIS, 2011, 260 (09) : 2674 - 2715
  • [43] Natasha: Faster Non-Convex Stochastic Optimization via Strongly Non-Convex Parameter
    Allen-Zhu, Zeyuan
    INTERNATIONAL CONFERENCE ON MACHINE LEARNING, VOL 70, 2017, 70
  • [44] Global optimization of non-convex piecewise linear regression splines
    Martinez, Nadia
    Anahideh, Hadis
    Rosenberger, Jay M.
    Martinez, Diana
    Chen, Victoria C. P.
    Wang, Bo Ping
    JOURNAL OF GLOBAL OPTIMIZATION, 2017, 68 (03) : 563 - 586
  • [45] On the numerical analysis of non-convex variational problems
    Pedregal, P.
    Zeitschrift fuer Angewandte Mathematik und Mechanik, ZAMM, Applied Mathematics and Mechanics, 76 (Suppl 1):
  • [46] Fuzzy clustering of non-convex patterns using global optimization
    Beliakov, G
    10TH IEEE INTERNATIONAL CONFERENCE ON FUZZY SYSTEMS, VOLS 1-3: MEETING THE GRAND CHALLENGE: MACHINES THAT SERVE PEOPLE, 2001, : 220 - 223
  • [47] Non-convex global optimization by the beta algorithm: A MAPLE code
    Delgado Pineda, M.
    NONLINEAR ANALYSIS-THEORY METHODS & APPLICATIONS, 2005, 63 (5-7) : E769 - E777
  • [48] Global optimization of non-convex piecewise linear regression splines
    Nadia Martinez
    Hadis Anahideh
    Jay M. Rosenberger
    Diana Martinez
    Victoria C. P. Chen
    Bo Ping Wang
    Journal of Global Optimization, 2017, 68 : 563 - 586
  • [49] Exact relaxations of non-convex variational problems
    Meziat, Rene
    Patino, Diego
    OPTIMIZATION LETTERS, 2008, 2 (04) : 505 - 519
  • [50] On radial solutions to non-convex variational problems
    FloresBazan, F
    HOUSTON JOURNAL OF MATHEMATICS, 1996, 22 (01): : 161 - 181
12345