Application of topological degree theory to semi-definite complementarity problem
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Publication:2743658
DOI10.1080/02331930108844541zbMath1054.90076OpenAlexW4236363547MaRDI QIDQ2743658
Vladimir A. Bulavsky, Vyacheslav V. Kalashnikov, George Isac
Publication date: 6 November 2001
Published in: Optimization (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1080/02331930108844541
Complementarity and equilibrium problems and variational inequalities (finite dimensions) (aspects of mathematical programming) (90C33) Degree, winding number (55M25)
Related Items (6)
Duality of implicit complementarity problems by using inversions and scalar derivatives ⋮ Solvability of implicit semidefinite and implicit copositive complementarity problems ⋮ A sufficient condition that has no exceptional family of elements for SDCP ⋮ Exceptional family and solvability of copositive complementarity problems ⋮ Duality in multivalued complementarity theory by using inversions and scalar derivatives ⋮ Complementarity problems and variational inequalities. A unified approach of solvability by an implicit Leray-Schauder type alternative
Cites Work
- A solution condition for complementarity problems: With an application to spatial price equilibrium
- Finite-dimensional variational inequality and nonlinear complementarity problems: A survey of theory, algorithms and applications
- Interior-Point Methods for the Monotone Semidefinite Linear Complementarity Problem in Symmetric Matrices
- Complementarity problems
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