The existence of maximum and minimum solutions to general variational inequalities in the Hilbert lattices
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Publication:537112
DOI10.1155/2011/904320zbMath1215.49015OpenAlexW1994502666WikidataQ59254449 ScholiaQ59254449MaRDI QIDQ537112
Publication date: 19 May 2011
Published in: Fixed Point Theory and Applications (Search for Journal in Brave)
Full work available at URL: https://eudml.org/doc/223346
Related Items (8)
Order-preservation properties of resolvent operators and their applications to variational inequalities ⋮ Order preservation of solution correspondence to single-parameter generalized variational inequalities on Hilbert lattices ⋮ Ordered variational inequalities and ordered complementarity problems in Banach lattices ⋮ Optimal solutions to variational inequalities on Banach lattices ⋮ Order-preservation properties of solution mapping for parametric equilibrium problems and their applications ⋮ Characterization of the Cone and Applications in Banach Spaces ⋮ Applications of order-theoretic fixed point theorems to discontinuous quasi-equilibrium problems ⋮ A class of uncertain variational inequality problems
Cites Work
- Variational and generalized variational inequalities with discontinuous mappings
- Generalized equilibrium problems and generalized complementarity problems
- Solvability of Variational Inequalities on Hilbert Lattices
- Equivalence of Linear Complementarity Problems and Linear Programs in Vector Lattice Hilbert Spaces
- A Least-Element Theory of Solving Linear Complementarity Problems as Linear Programs
- Fixed Points of Order Preserving Multifunctions
- The Linear Order Complementarity Problem
- Complementarity problems
- Generalized variational inequalities and generalized quasi-variational inequalities
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