In this work we unify and generalize the existing definitions of derivatives of functions by presenting a new concept on differentiability
AbstractWe find an equivalent condition for a continuous vector-valued path to be Lebesgue equivalen...
In a beginning calculus course, one of the many concepts we learn about is differentiability. Recal...
Preiss1 and Jaroslav Tǐser2 In this note we present two examples illustrating some surprising rela-...
We revisit some basic concepts and ideas of the classical differential calculus and convex analysis ...
The present work either extends or improves several results on lineability of differentiable functio...
LET f: X → ℝ BE A function on a Banach space X. We say that f is strictly Gateaux differentiable if ...
AbstractThe main result of this note says that, if the norm of a Banach space E is differentiable (F...
summary:We improve a theorem of P.G. Georgiev and N.P. Zlateva on G\^ateaux differentiability of Lip...
We construct differentiable manifolds modelled on locally convex spaces using Yamamuro ' s theory o...
Let X be a finite dimensional real Banach space. We show that if the contingent of the curve Γ : (a,...
This book makes a significant inroad into the unexpectedly difficult question of existence of Frchet...
AbstractThe modification of the Clarke generalized subdifferential due to Michel and Penot is a usef...
We study the relationships between Gateaux, Fréchet and weak Hadamard differentiability of convex fu...
One of the main tools in geometric function theory is the fact that the area formula is true for Lip...
In infinite-dimensional spaces there are non-equivalent notions of continuous differentiability whic...
AbstractWe find an equivalent condition for a continuous vector-valued path to be Lebesgue equivalen...
In a beginning calculus course, one of the many concepts we learn about is differentiability. Recal...
Preiss1 and Jaroslav Tǐser2 In this note we present two examples illustrating some surprising rela-...
We revisit some basic concepts and ideas of the classical differential calculus and convex analysis ...
The present work either extends or improves several results on lineability of differentiable functio...
LET f: X → ℝ BE A function on a Banach space X. We say that f is strictly Gateaux differentiable if ...
AbstractThe main result of this note says that, if the norm of a Banach space E is differentiable (F...
summary:We improve a theorem of P.G. Georgiev and N.P. Zlateva on G\^ateaux differentiability of Lip...
We construct differentiable manifolds modelled on locally convex spaces using Yamamuro ' s theory o...
Let X be a finite dimensional real Banach space. We show that if the contingent of the curve Γ : (a,...
This book makes a significant inroad into the unexpectedly difficult question of existence of Frchet...
AbstractThe modification of the Clarke generalized subdifferential due to Michel and Penot is a usef...
We study the relationships between Gateaux, Fréchet and weak Hadamard differentiability of convex fu...
One of the main tools in geometric function theory is the fact that the area formula is true for Lip...
In infinite-dimensional spaces there are non-equivalent notions of continuous differentiability whic...
AbstractWe find an equivalent condition for a continuous vector-valued path to be Lebesgue equivalen...
In a beginning calculus course, one of the many concepts we learn about is differentiability. Recal...
Preiss1 and Jaroslav Tǐser2 In this note we present two examples illustrating some surprising rela-...