Author:
Bauschke Heinz H.,Borwein Jonathan M.,Wang Xianfu,Yao Liangjin
Publisher
Springer Science and Business Media LLC
Subject
Applied Mathematics,Geometry and Topology,Numerical Analysis,Statistics and Probability,Analysis
Reference42 articles.
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2. Bauschke H.H., Borwein, J.M.: Maximal monotonicity of dense type, local maximal monotonicity, and monotonicity of the conjugate are all the same for continuousi linear operators. Pac. J. Math. 189, 1–20 (1999)
3. Bauschke H.H., Wang, X., Yao, L.: Examples of discontinuous maximal monotone linear operators and the solution to a recent problem posed by B.F. Svaiter. J. Math. Anal. Appl. 370, 224–241 (2010)
4. Bauschke H.H., Borwein, J.M., Wang, X., Yao, L.: For maximally monotone linear relations, dense type, negative-infimum type, and Fitzpatrick–Phelps type all coincide with monotonicity of the adjoint. arXiv:1103.6239v1 (2011)
5. Bauschke H.H., Borwein, J.M., Wang, X., Yao, L.: Every maximally monotone operator of Fitzpatrick–Phelps type is actually of dense type. Optim. Lett. arXiv:1104.0750v1 (2011)
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