Bornological coderivative and subdifferential calculus in smooth banach spaces

Bornological spaces of non-Archimedean valued functions

Katsaras, A.K.

March 1987

AbstractLet C(X,E) be the space of all continuous functions from an ultraregular space X to a non-Ar...

Seung On Lee
Eun Pyo Lee

October 2016

We introduce and investigate the concepts of (Ti, Tj)-fuzzy β-(r, s)-open sets, (Ti, Tj)-fuzzy β-(r,...

Equivalence among Various Generalized Derivatives and Generalized Subdifferentials of Functions Defined on Binormed Spaces

S. Lahrech
A. Bouaicha

November 2015

We take any binormed space (E, ‖.‖1, ‖.‖2) such that (E, ‖.‖2) is a Banach space and the norm ‖.‖2 i...

Bornological Coderivative and Subdifferential Calculus in Smooth Banach Spaces

Nguyen, Mau
Phan, Hung M.
Wang, Bingwu

December 2019

In this paper, we study bornological generalized differential properties of sets with nonsmooth boun...

On the Equivalence of Some Basic Principles in Variational Analysis

Borwein, Jonathan M
Mordukhovich, Boris S
Shao, Yongheng

January 1999

AbstractThe primary goal of this paper is to study relationships between certain basic principles of...

On the equivalence of some basic principles in variational analysis

Borwein, Jonathan M.
Mordukhovich, Boris S.
Shao, Yongheng

January 1999

The primary goal of this paper is to study relationships between certain basic principles of variati...

Bornological structures in the context of L-fuzzy sets

Rs Šostak

September 2016

In order to apply the concept of boundedness, so crucial in the theory of metric spaces, to the case...

Nonsmooth sequential analysis in Asplund spaces

Mordukhovich, B.S.
Shao, Y.

April 1996

We develop a generalized differentiation theory for nonsmooth functions and sets with nonsmooth boun...

The fuzzy intersection rule in variational analysis with applications

Wang, Bingwu

November 2006

AbstractThe fuzzy intersection rule for Fréchet normal cones in Asplund spaces was established by Mo...

Proximal analysis and boundaries of closed sets in Banach space, Part I: theory

Borwein, J. M.
Strojwas, H. M.

January 1986

As various types of tangent cones, generalized derivatives and subgradients prove to be a useful too...

Epi-Lipschitz-like sets in Banach space: theorems and examples

Borwein, Jonathan Michael

January 1987

One can, following Rockafellar, define generalized derivatives of arbitrary functions on arbitrary t...

Mixed coderivatives of set-valued mappings in variational analysis

Mordukhovich, B.S.
Shao, Y.

January 1998

We consider a refined coderivative construction for nonsmooth and set-valued mappings between Banach...

Separable reductions and rich families in theory of Fréchet subdifferentials

Fabian, Marián

January 2015

We consider important properties of Fréchet subdifferentials, in particular: the non-emptiness of su...

RESTRICTIVE METRIC REGULARITY AND GENERALIZED DIFFERENTIAL CALCULUS IN BANACH SPACES

Boris S. Mordukhovich
Bingwu Wang

January 2004

We consider nonlinear mappings f:X → Y between Banach spaces and study the notion of restrictive met...

Viscosity solutions and viscosity subderivatives in smooth Banach spaces with applications to metric regularity

Borwein, Jonathan M.
Zhu, Qiji J.

January 1996

In Gateaux or bornologically differentiable spaces there are two natural generalizations of the conc...

Bornological spaces of non-Archimedean valued functions

Katsaras, A.K.

March 1987

AbstractLet C(X,E) be the space of all continuous functions from an ultraregular space X to a non-Ar...

Fuzzy β-(r, s)-

Seung On Lee
Eun Pyo Lee

October 2016

We introduce and investigate the concepts of (Ti, Tj)-fuzzy β-(r, s)-open sets, (Ti, Tj)-fuzzy β-(r,...

Equivalence among Various Generalized Derivatives and Generalized Subdifferentials of Functions Defined on Binormed Spaces

S. Lahrech
A. Bouaicha

November 2015

We take any binormed space (E, ‖.‖1, ‖.‖2) such that (E, ‖.‖2) is a Banach space and the norm ‖.‖2 i...

Bornological Coderivative and Subdifferential Calculus in Smooth Banach Spaces

Nguyen, Mau
Phan, Hung M.
Wang, Bingwu

December 2019

In this paper, we study bornological generalized differential properties of sets with nonsmooth boun...

On the Equivalence of Some Basic Principles in Variational Analysis

Borwein, Jonathan M
Mordukhovich, Boris S
Shao, Yongheng

January 1999

AbstractThe primary goal of this paper is to study relationships between certain basic principles of...

On the equivalence of some basic principles in variational analysis

Borwein, Jonathan M.
Mordukhovich, Boris S.
Shao, Yongheng

January 1999

The primary goal of this paper is to study relationships between certain basic principles of variati...

Bornological structures in the context of L-fuzzy sets

Rs Šostak

September 2016

In order to apply the concept of boundedness, so crucial in the theory of metric spaces, to the case...

Nonsmooth sequential analysis in Asplund spaces

Mordukhovich, B.S.
Shao, Y.

April 1996

We develop a generalized differentiation theory for nonsmooth functions and sets with nonsmooth boun...

The fuzzy intersection rule in variational analysis with applications

Wang, Bingwu

November 2006

AbstractThe fuzzy intersection rule for Fréchet normal cones in Asplund spaces was established by Mo...

Proximal analysis and boundaries of closed sets in Banach space, Part I: theory

Borwein, J. M.
Strojwas, H. M.

January 1986

As various types of tangent cones, generalized derivatives and subgradients prove to be a useful too...

Epi-Lipschitz-like sets in Banach space: theorems and examples

Borwein, Jonathan Michael

January 1987

One can, following Rockafellar, define generalized derivatives of arbitrary functions on arbitrary t...

Mixed coderivatives of set-valued mappings in variational analysis

Mordukhovich, B.S.
Shao, Y.

January 1998

We consider a refined coderivative construction for nonsmooth and set-valued mappings between Banach...

Separable reductions and rich families in theory of Fréchet subdifferentials

Fabian, Marián

January 2015

We consider important properties of Fréchet subdifferentials, in particular: the non-emptiness of su...

RESTRICTIVE METRIC REGULARITY AND GENERALIZED DIFFERENTIAL CALCULUS IN BANACH SPACES

Boris S. Mordukhovich
Bingwu Wang

January 2004

We consider nonlinear mappings f:X → Y between Banach spaces and study the notion of restrictive met...

Viscosity solutions and viscosity subderivatives in smooth Banach spaces with applications to metric regularity

Borwein, Jonathan M.
Zhu, Qiji J.

January 1996

In Gateaux or bornologically differentiable spaces there are two natural generalizations of the conc...

Bornological spaces of non-Archimedean valued functions

Katsaras, A.K.

March 1987

AbstractLet C(X,E) be the space of all continuous functions from an ultraregular space X to a non-Ar...

Fuzzy β-(r, s)-

Seung On Lee
Eun Pyo Lee

October 2016

We introduce and investigate the concepts of (Ti, Tj)-fuzzy β-(r, s)-open sets, (Ti, Tj)-fuzzy β-(r,...

Equivalence among Various Generalized Derivatives and Generalized Subdifferentials of Functions Defined on Binormed Spaces

S. Lahrech
A. Bouaicha

November 2015

We take any binormed space (E, ‖.‖1, ‖.‖2) such that (E, ‖.‖2) is a Banach space and the norm ‖.‖2 i...

Bornological coderivative and subdifferential calculus in smooth banach spaces

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Bornological coderivative and subdifferential calculus in smooth banach spaces

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