On error bounds of polynomial complementarity problems with structured tensors
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Publication:4639133
DOI10.1080/02331934.2017.1391254zbMath1427.90275OpenAlexW2765130217WikidataQ114100901 ScholiaQ114100901MaRDI QIDQ4639133
Chen Ling, Hongjin He, Liyun Ling
Publication date: 3 May 2018
Published in: Optimization (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1080/02331934.2017.1391254
error boundpolynomial complementarity problem\(\mathbf{ER}\)-tensor\(\mathbf{P}\)-functionsemicopositive function
Related Items (25)
Error bounds for the solution sets of generalized polynomial complementarity problems ⋮ Error bounds for the solution sets of quadratic complementarity problems ⋮ On the R0-tensors and the solution map of tensor complementarity problems ⋮ Existence and uniqueness of solutions of the generalized polynomial variational inequality ⋮ Lower bounds of the solution set of the polynomial complementarity problem ⋮ Structured tensor tuples to polynomial complementarity problems ⋮ A general preconditioner for tensor complementarity problems ⋮ A fixed point iterative method for tensor complementarity problems ⋮ Stability of Solutions and Continuity of Solution Maps of Tensor Complementarity Problems ⋮ Bounds of the solution set of the tensor complementarity problem ⋮ Generalized Tensor Complementarity Problems Over a Polyhedral Cone ⋮ Nonemptiness and compactness of solution sets to generalized polynomial complementarity problems ⋮ Tensor complementarity problems. I: Basic theory ⋮ Acceptable solutions and backward errors for tensor complementarity problems ⋮ An index detecting algorithm for a class of TCP \((\mathcal{A},q)\) equipped with nonsingular \(\mathcal{M}\)-tensors ⋮ A Note on the Nonemptiness and Compactness of Solution Sets of Weakly Homogeneous Variational Inequalities ⋮ Pseudospectra localization sets of tensors with applications ⋮ Unique solvability of weakly homogeneous generalized variational inequalities ⋮ Nonemptiness and compactness of solution sets to weakly homogeneous generalized variational inequalities ⋮ Solvability of two classes of tensor complementarity problems ⋮ Notes on the optimization problems corresponding to polynomial complementarity problems ⋮ Linearized methods for tensor complementarity problems ⋮ Connectedness of the solution set of the tensor complementarity problem ⋮ Estimations on upper and lower bounds of solutions to a class of tensor complementarity problems ⋮ Generalized polynomial complementarity problems over a polyhedral cone
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