Lipschitzian \(\mathbb{Q}\)-matrices are \(\mathbb{P}\)-matrices
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Publication:1352303
DOI10.1007/BF02592146zbMath0870.90094OpenAlexW1481359246MaRDI QIDQ1352303
G. S. R. Murthy, Sabatini, Marco, Thiruvenkatachari Parthasarathy
Publication date: 15 September 1997
Published in: Mathematical Programming. Series A. Series B (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/bf02592146
Related Items (11)
On strong \(Z\)-matrices ⋮ Error bounds in mathematical programming ⋮ On Lipschitzian \(Q_ 0\) and INS matrices ⋮ Preface: International conference on game theory and optimization, June 6--10, 2016, Indian Institute of Technology Madras, Chennai, India ⋮ T. Parthasarathy's contributions to complementarity problems: a survey ⋮ On the Lipschitz continuity of the solution map in linear complementarity problems over second-order cone ⋮ Constructive characterization of Lipschitzian \(Q_ 0\)-matrices ⋮ On a global projection-type error bound for the linear complementarity problem ⋮ Lipschitz continuity of the solution mapping of symmetric cone complementarity problems ⋮ On the Lipschitzian property in linear complementarity problems over symmetric cones ⋮ On an interconnection between the Lipschitz continuity of the solution map and the positive principal minor property in linear complementarity problems over Euclidean Jordan algebras
Cites Work
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- Constructive characterization of Lipschitzian \(Q_ 0\)-matrices
- Almost N-matrices and linear complementarity
- On the Continuity of the Solution Map in Linear Complementarity Problems
- Applications of Degree Theory to Linear Complementarity Problems
- Lipschitz Continuity of Solutions of Linear Inequalities, Programs and Complementarity Problems
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