A merit function method for infinite-dimensional SOCCPs
From MaRDI portal
Publication:549841
DOI10.1016/j.jmaa.2011.05.019zbMath1239.46052OpenAlexW1980704350MaRDI QIDQ549841
Shaohua Pan, Jein-Shan Chen, Yungyen Chiang
Publication date: 18 July 2011
Published in: Journal of Mathematical Analysis and Applications (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.jmaa.2011.05.019
Related Items
Bishop–Phelps cones given by an equation in Banach spaces ⋮ SOC-monotone and SOC-convex functions vs. matrix-monotone and matrix-convex functions ⋮ GUS-property for Lorentz cone linear complementarity problems on Hilbert spaces ⋮ Analysis of nonsmooth vector-valued functions associated with infinite-dimensional second-order cones ⋮ Three classes of merit functions for the complementarity problem over a closed convex cone
Cites Work
- Unnamed Item
- Unnamed Item
- A damped Gauss-Newton method for the second-order cone complementarity problem
- Two classes of merit functions for the second-order cone complementarity problem
- A one-parametric class of merit functions for the second-order cone complementarity problem
- A new class of semismooth Newton-type methods for nonlinear complementarity problems
- Primal-dual algorithms and infinite-dimensional Jordan algebras of finite rank
- On implementing a primal-dual interior-point method for conic quadratic optimization
- Polynomial convergence of primal-dual algorithms for the second-order cone program based on the MZ-family of directions
- Complementarity functions and numerical experiments on some smoothing Newton methods for second-order-cone complementarity problems
- Strong semismoothness of the Fischer-Burmeister SDC and SOC complementarity functions
- An unconstrained smooth minimization reformulation of the second-order cone complementarity problem
- Smoothing Functions for Second-Order-Cone Complementarity Problems
- Equivalence of the Complementarity Problem to a System of Nonlinear Equations
- A special newton-type optimization method
- A convergence analysis of the scaling-invariant primal-dual path-following algorithms for second-order cone programming
- On the Local Convergence of Semismooth Newton Methods for Linear and Nonlinear Second-Order Cone Programs Without Strict Complementarity
- A Combined Smoothing and Regularization Method for Monotone Second-Order Cone Complementarity Problems
- Interior Point Trajectories and a Homogeneous Model for Nonlinear Complementarity Problems over Symmetric Cones
This page was built for publication: A merit function method for infinite-dimensional SOCCPs
