https://ogma.newcastle.edu.au/vital/access/ /manager/Index ${session.getAttribute("locale")} 5 On supportless convex sets https://ogma.newcastle.edu.au/vital/access/ /manager/Repository/uon:13005 Wed 11 Apr 2018 17:03:15 AEST ]]> Mosco convergence and the Kadec property https://ogma.newcastle.edu.au/vital/access/ /manager/Repository/uon:13027 Wed 11 Apr 2018 15:10:01 AEST ]]> Recent results on Douglas-Rachford methods https://ogma.newcastle.edu.au/vital/access/ /manager/Repository/uon:20518 Wed 11 Apr 2018 14:50:28 AEST ]]> Banach spaces that admit support sets https://ogma.newcastle.edu.au/vital/access/ /manager/Repository/uon:13003 Wed 11 Apr 2018 14:25:24 AEST ]]> Constructible convex sets https://ogma.newcastle.edu.au/vital/access/ /manager/Repository/uon:14692 Wed 11 Apr 2018 11:13:37 AEST ]]> Dykstra's alternating projection algorithm for two sets https://ogma.newcastle.edu.au/vital/access/ /manager/Repository/uon:14063 Sat 24 Mar 2018 08:22:33 AEDT ]]> On the convergence of von Neumann's alternating projection algorithm for two sets https://ogma.newcastle.edu.au/vital/access/ /manager/Repository/uon:13150 Sat 24 Mar 2018 08:18:08 AEDT ]]> Antiproximinal norms in Banach spaces https://ogma.newcastle.edu.au/vital/access/ /manager/Repository/uon:13078 0 has an antiproximinal body for a suitable norm. If, in addition, the space is separable, there is a pair of antiproximinal norms. In particular, in a separable polyhedral space X, the set of all (equivalent) norms on X having an isomorphic antiproximinal norm is dense. In contrast, it is shown that there are no antiproximinal norms in Banach spaces with the convex point of continuity property (CPCP). Other questions related to the existence of antiproximinal bodies are also discussed.]]> Sat 24 Mar 2018 08:15:36 AEDT ]]>