Items where Subject is "65-xx Numerical analysis > 65Kxx Mathematical programming, optimization and variational techniques"
Group by: Creators | Item Type
Number of items at this level: 13.
Aragón Artacho, Francisco J. and Dontchev, Asen L. and Geoffroy, Michel H. (2007) Convergence of the proximal point method for metrically regular mappings. ESAIM: Proceedings, 17 . pp. 1-8. ISSN 1270-900X
Aragón Artacho, Francisco J. and Borwein, Jonathan M. (2012) Global convergence of a non-convex Douglas–Rachford iteration. Journal of Global Optimization . ISSN 0925-5001
Aragón Artacho, Francisco J. and Borwein, Jonathan M. and Tam, Matthew K (2014) Douglas-Rachford feasibility methods for matrix completion problems. ANZIAM Journal .
Bauschke, Heinz H. (1994) A Norm Convergence Result on Random Products of Relaxed Projections in Hilbert Space. [Preprint]
Bauschke, Heinz H. (1994) The approximation of fixed points of compositions of nonexpansive mappings in Hilbert space. [Preprint]
Bauschke, Heinz H. and Borwein, Jonathan M. (1997) Legendre functions and the method of random Bregman projections. Journal of Convex Analysis, 4 (1). pp. 27-67. ISSN 0944-6532
Bauschke, Heinz H. and Borwein, Jonathan M. (1996) On Projection Algorithms for Solving Convex Feasibility Problems. SIAM Review, 38 (3). pp. 367-426.
Bauschke, Heinz H. and Borwein, Jonathan M. and Lewis, Adrian (1994) On the method of cyclic projections for convex sets in Hilbert space. [Preprint]
Bauschke, Heinz H. and Combettes, Patrick L. (1999) A Weak-to-Strong Convergence Principle for Fejer-Monotone Methods in Hilbert Spaces. [Preprint]
Bauschke, Heinz H. and Noll, Dominik (2001) The method of forward projections. [Preprint]
Hare, Warren and Lewis, Adrian (2003) Identifying active constraints via partial smoothness and prox-regularity. [Preprint]
Macklem, Mason S. (2009) Low-Dimensional Curvature Methods in Derivative-Free Optimization on Shared Computing Networks. PhD thesis, Dalhousie University.
Tam, Matthew K (2016) Iterative Projection and Reflection Methods: Theory and Practice. PhD thesis, University of Newcastle.