We prove a new variational principle which in particular does not assume the completeness of the domain. As an application we give a new, more natural, proof of the fact that a real valued Lipschitz function on an Asplund space has points of Frechet differentiability
AbstractDavid Preiss proved that every locally Lipschitz function on an open subset of a Banach spac...
In this thesis, we discuss about the connection between Lipschitz function and differentiable functi...
Abstract. We construct two counter-examples related to Fréchet differentiabil-ity in infinite dimen...
AbstractThe main result of this note says that, if the norm of a Banach space E is differentiable (F...
This book makes a significant inroad into the unexpectedly difficult question of existence of Frchet...
summary:We present some consequences of a deep result of J. Lindenstrauss and D. Preiss on $\Gamma$-...
The deep Preiss theorem states that a Lipschitz function on a nonempty open subset of an Asplund spa...
AbstractThis paper considers Fréchet differentiability almost everywhere in the sense of category of...
We show that given any Borel measure on , every Lipschitz function is -a. e. differentiable with res...
Preiss1 and Jaroslav Tǐser2 In this note we present two examples illustrating some surprising rela-...
It is known that every Gδ subset E of the plane containing a dense set of lines, even if it has meas...
AbstractWe show that Asplund sets are effective tools to study differentiability of Lipschitz functi...
summary:We improve a theorem of P.G. Georgiev and N.P. Zlateva on G\^ateaux differentiability of Lip...
One of the main tools in geometric function theory is the fact that the area formula is true for Lip...
Abstract. We prove that a Banach space X has the Schur property if and only if every X-valued weakly...
AbstractDavid Preiss proved that every locally Lipschitz function on an open subset of a Banach spac...
In this thesis, we discuss about the connection between Lipschitz function and differentiable functi...
Abstract. We construct two counter-examples related to Fréchet differentiabil-ity in infinite dimen...
AbstractThe main result of this note says that, if the norm of a Banach space E is differentiable (F...
This book makes a significant inroad into the unexpectedly difficult question of existence of Frchet...
summary:We present some consequences of a deep result of J. Lindenstrauss and D. Preiss on $\Gamma$-...
The deep Preiss theorem states that a Lipschitz function on a nonempty open subset of an Asplund spa...
AbstractThis paper considers Fréchet differentiability almost everywhere in the sense of category of...
We show that given any Borel measure on , every Lipschitz function is -a. e. differentiable with res...
Preiss1 and Jaroslav Tǐser2 In this note we present two examples illustrating some surprising rela-...
It is known that every Gδ subset E of the plane containing a dense set of lines, even if it has meas...
AbstractWe show that Asplund sets are effective tools to study differentiability of Lipschitz functi...
summary:We improve a theorem of P.G. Georgiev and N.P. Zlateva on G\^ateaux differentiability of Lip...
One of the main tools in geometric function theory is the fact that the area formula is true for Lip...
Abstract. We prove that a Banach space X has the Schur property if and only if every X-valued weakly...
AbstractDavid Preiss proved that every locally Lipschitz function on an open subset of a Banach spac...
In this thesis, we discuss about the connection between Lipschitz function and differentiable functi...
Abstract. We construct two counter-examples related to Fréchet differentiabil-ity in infinite dimen...