Add to ORKGIn this paper, we show how Fitzpatrick functions can be used to obtain various results on the local boundedness, domain and surjectivity of monotone and maximal monotone multifunctions on a Banach space, and also to clarify the relationships between different subclasses of the set of maximal monotone multifunctions. © Heldermann Verlag
This paper presents applications of Fitzparick functions to optimization problems. The main purpose ...
summary:This paper is an informal presentation of material from [28]–[34]. The monotone envelopes of...
In this paper, we construct maximally monotone operators that are not of Gossez’s dense-type (D) in ...
Within a nonzero, real Banach space we study the problem of characterising a maximal extension of a ...
In this new edition of LNM 1693 the essential idea is to reduce questions on monotone multifunctions...
In the recent literature, the connection between maximal monotone operators and the Fitzpatrick func...
The aim of this paper is to show that every representative function of a maximally monotone operator...
The notion of a maximal monotone operator is crucial in optimization as it captures both the subdiff...
Abstract. The notion of a maximal monotone operator is crucial in optimization as it captures both t...
Focussing on the theory (both classical and recent) of monotone multifunctions on a (possibly nonref...
Several deeper results on maximal monotone operators have recently found simpler proofs using Fitzpa...
Dedicated to the memory of Simon Fitzpatrick In 1988, Simon Fitzpatrick defined a new convex functio...
(Received 00 Month 200x; In final form 00 Month 200x) For each monotone bifunction F defined on a su...
Within a nonzero, real Banach space we show that a monotone operator with a bounded domain that is r...
Abstract. We consider bifunctions F: C ×C → R where C is an arbitrary subset of a Banach space. We s...
This paper presents applications of Fitzparick functions to optimization problems. The main purpose ...
summary:This paper is an informal presentation of material from [28]–[34]. The monotone envelopes of...
In this paper, we construct maximally monotone operators that are not of Gossez’s dense-type (D) in ...
Within a nonzero, real Banach space we study the problem of characterising a maximal extension of a ...
In this new edition of LNM 1693 the essential idea is to reduce questions on monotone multifunctions...
In the recent literature, the connection between maximal monotone operators and the Fitzpatrick func...
The aim of this paper is to show that every representative function of a maximally monotone operator...
The notion of a maximal monotone operator is crucial in optimization as it captures both the subdiff...
Abstract. The notion of a maximal monotone operator is crucial in optimization as it captures both t...
Focussing on the theory (both classical and recent) of monotone multifunctions on a (possibly nonref...
Several deeper results on maximal monotone operators have recently found simpler proofs using Fitzpa...
Dedicated to the memory of Simon Fitzpatrick In 1988, Simon Fitzpatrick defined a new convex functio...
(Received 00 Month 200x; In final form 00 Month 200x) For each monotone bifunction F defined on a su...
Within a nonzero, real Banach space we show that a monotone operator with a bounded domain that is r...
Abstract. We consider bifunctions F: C ×C → R where C is an arbitrary subset of a Banach space. We s...
This paper presents applications of Fitzparick functions to optimization problems. The main purpose ...
summary:This paper is an informal presentation of material from [28]–[34]. The monotone envelopes of...
In this paper, we construct maximally monotone operators that are not of Gossez’s dense-type (D) in ...