Iterative methods for nonlinear complementarity problems on isotone projection cones
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Publication:2517700
DOI10.1016/j.jmaa.2008.09.066zbMath1162.47050OpenAlexW1988400453MaRDI QIDQ2517700
Publication date: 8 January 2009
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.2008.09.066
Related Items (23)
Extended Lorentz cones and variational inequalities on cylinders ⋮ Generalized isotone projection cones ⋮ Implicit complementarity problems on isotone projection cones ⋮ Lattice-like Subsets of Euclidean Jordan Algebras ⋮ Solvability of Variational Inequalities on Hilbert Lattices ⋮ A geometrical approach to iterative isotone regression ⋮ Isotonicity of the metric projection by Lorentz cone and variational inequalities ⋮ Complementarity problems via common fixed points in vector lattices ⋮ Closed-Form Expressions for Projectors onto Polyhedral Sets in Hilbert Spaces ⋮ Order preservation of solution correspondence to single-parameter generalized variational inequalities on Hilbert lattices ⋮ Characterization of latticial cones in Hilbert spaces by isotonicity and generalized infimum ⋮ Finding solutions of implicit complementarity problems by isotonicity of the metric projection ⋮ Extension procedures for lattice Lipschitz operators on Euclidean spaces ⋮ Generalized projections onto convex sets ⋮ A duality between the metric projection onto a convex cone and the metric projection onto its dual ⋮ Lattice-like operations and isotone projection sets ⋮ Solving nonlinear complementarity problems by isotonicity of the metric projection ⋮ On the equivalence between some projected and modulus-based splitting methods for linear complementarity problems ⋮ How to project onto an isotone projection cone ⋮ Isotone retraction cones in Hilbert spaces ⋮ Characterization of the Cone and Applications in Banach Spaces ⋮ Characterization of subdual latticial cones in Hilbert spaces by the isotonicity of the metric projection ⋮ Extended Lorentz cones and mixed complementarity problems
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