Add to ORKGIn his '23' "Mathematische Probleme" lecture to the Paris International Congress in 1900, David Hilbert wrote "Besides it is an error to believe that rigor in the proof is the enemy of simplicity." In this spirit, we use simple convex analytic methods, relying on an ingenious function due to Simon Fitzpatrick, to provide a concise proof of the maximality of the sum of two maximal monotone operators on reflexive Banach space under standard transversality conditions. Many other extension, surjectivity, convexity and local boundedness results are likewise established
We answer a few questions raised by S. Fitzpatrick concerning the representation of maximal monotone...
Focussing on the theory (both classical and recent) of monotone multifunctions on a (possibly nonref...
The improved and expanded second edition contains expositions of some major results which have been ...
We use methods from convex analysis, relying on an ingenious function of Simon Fitzpatrick, to prove...
We combine methods from convex analysis, based on a function of Simon Fitzpatrick, with a fine recen...
AbstractIn this paper we give some conditions under whichT+∂fis maximal monotone in the Banach space...
The concept of a monotone operator — which covers both linear positive semi-definite operators and s...
The concept of a monotone operator --- which covers both linear positive semi-definite operators and...
In this paper, we study convex analysis and its theoretical applications. We first apply important t...
In this paper, we study convex analysis and its theoretical applications. We first apply important t...
Recently, the authors studied the connection between each maximal monotone operator T and a family H...
The concept of a monotone operator — which covers both linear positive semi-definite operators and s...
We introduce new representations for maximal monotone operators. We relate them to previous represen...
The concept of a monotone operator — which covers both linear positive semi-definite operators and s...
The question whether or not the sum of two maximal monotone operators is maximal mono-tone under Roc...
We answer a few questions raised by S. Fitzpatrick concerning the representation of maximal monotone...
Focussing on the theory (both classical and recent) of monotone multifunctions on a (possibly nonref...
The improved and expanded second edition contains expositions of some major results which have been ...
We use methods from convex analysis, relying on an ingenious function of Simon Fitzpatrick, to prove...
We combine methods from convex analysis, based on a function of Simon Fitzpatrick, with a fine recen...
AbstractIn this paper we give some conditions under whichT+∂fis maximal monotone in the Banach space...
The concept of a monotone operator — which covers both linear positive semi-definite operators and s...
The concept of a monotone operator --- which covers both linear positive semi-definite operators and...
In this paper, we study convex analysis and its theoretical applications. We first apply important t...
In this paper, we study convex analysis and its theoretical applications. We first apply important t...
Recently, the authors studied the connection between each maximal monotone operator T and a family H...
The concept of a monotone operator — which covers both linear positive semi-definite operators and s...
We introduce new representations for maximal monotone operators. We relate them to previous represen...
The concept of a monotone operator — which covers both linear positive semi-definite operators and s...
The question whether or not the sum of two maximal monotone operators is maximal mono-tone under Roc...
We answer a few questions raised by S. Fitzpatrick concerning the representation of maximal monotone...
Focussing on the theory (both classical and recent) of monotone multifunctions on a (possibly nonref...
The improved and expanded second edition contains expositions of some major results which have been ...
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