https://ogma.newcastle.edu.au/vital/access/ /manager/Index en-au 5 The Brezis–Browder Theorem in a general Banach space https://ogma.newcastle.edu.au/vital/access/ /manager/Repository/uon:12912 Wed 11 Apr 2018 16:03:52 AEST ]]> Maximality of the sum of a maximally monotone linear relation and a maximally monotone operator https://ogma.newcastle.edu.au/vital/access/ /manager/Repository/uon:22219 Wed 11 Apr 2018 12:44:31 AEST ]]> Construction of pathological maximally monotone operators on non-reflexive Banach spaces https://ogma.newcastle.edu.au/vital/access/ /manager/Repository/uon:12910 0 or its dual ℓ¹, admits a non type (D) operator. The existence of non type (D) operators in spaces containing ℓ¹ or c ₀ has been proved recently by Bueno and Svaiter.]]> Wed 11 Apr 2018 11:52:13 AEST ]]> Rectangularity and paramonotonicity of maximally monotone operators https://ogma.newcastle.edu.au/vital/access/ /manager/Repository/uon:21273 Sat 24 Mar 2018 07:54:42 AEDT ]]> Monotone operators and "bigger conjugate" functions https://ogma.newcastle.edu.au/vital/access/ /manager/Repository/uon:16166 Sat 24 Mar 2018 07:52:27 AEDT ]]> Maximally monotone linear subspace extensions of monotone subspaces: explicit constructions and characterizations https://ogma.newcastle.edu.au/vital/access/ /manager/Repository/uon:20119 Sat 24 Mar 2018 07:51:46 AEDT ]]> Sum theorems for maximally monotone operators of type (FPV) https://ogma.newcastle.edu.au/vital/access/ /manager/Repository/uon:21030 A + B provided that A and B are maximally monotone operators such that star(dom A) ∩ int dom B ≠ ∅, and A is of type (FPV). We show that when also dom A is convex, the sum operator A + B is also of type (FPV). Our result generalizes and unifies several recent sum theorems.]]> Sat 24 Mar 2018 07:50:34 AEDT ]]> Recent progress on monotone operator theory https://ogma.newcastle.edu.au/vital/access/ /manager/Repository/uon:26270 Sat 24 Mar 2018 07:40:16 AEDT ]]>