Add to ORKGWe develop a notion of derivative of a real-valued function on a Banach space, called the L-derivative, which is constructed by introducing a gener-alization of Lipschitz constant of a map. As with the Clarke gradient, the values of the L-derivative of a function are non-empty weak * compact and convex subsets of the dual of the Banach space. The L-derivative, however, is shown to be upper semi continuous, a result which is not known to hold for the Clarke gradient. We also formulate the notion of primitive maps dual to the L-derivative, an extension of Fundamental Theorem of Calculus for the L-derivative and a domain for computation of real-valued functions on a Banach space with a corresponding notion of effectivity. For real-valued funct...
AbstractThis paper considers Fréchet differentiability almost everywhere in the sense of category of...
Sorry, this article is being rewritten. Please email the author to be informed about its availabilit...
Abstract. We prove that if f is a real valued lower semicontinuous function on a Banach space X and ...
We develop a notion of derivative of a real-valued function on a Banach space, called the L-derivati...
AbstractWe show that the Scott topology induces a topology for real-valued Lipschitz maps on Banach ...
We introduce a logical theory of differentiation for a real-valued function on a finite dimensional ...
© 2015 IEEE.We introduce in the context of differential and integral calculus several key extensions...
AbstractWe introduce the Lipschitz derivative or the L-derivative of a locally Lipschitz complex map...
Clarke's generalized derivative $f^0(x,v)$ is studied as a function on the Banach algebra Lip(X,d) o...
We survey recent results on the structure of the range of the derivative of a smooth real valued fun...
We introduce a domain-theoretic framework for differential calculus. We define the set of primitive ...
We introduce a typed lambda calculus in which real numbers, real functions, and in particular contin...
This thesis investigates the properties and applications of derivatives of functions whose domain an...
Abstract. Clarke’s generalized derivative f0(x, v) is studied as a function on the Banach algebra Li...
The Clarke derivative of a locally Lipschitz function is defined by f<sup>o</sup>(x;v):=[formula can...
AbstractThis paper considers Fréchet differentiability almost everywhere in the sense of category of...
Sorry, this article is being rewritten. Please email the author to be informed about its availabilit...
Abstract. We prove that if f is a real valued lower semicontinuous function on a Banach space X and ...
We develop a notion of derivative of a real-valued function on a Banach space, called the L-derivati...
AbstractWe show that the Scott topology induces a topology for real-valued Lipschitz maps on Banach ...
We introduce a logical theory of differentiation for a real-valued function on a finite dimensional ...
© 2015 IEEE.We introduce in the context of differential and integral calculus several key extensions...
AbstractWe introduce the Lipschitz derivative or the L-derivative of a locally Lipschitz complex map...
Clarke's generalized derivative $f^0(x,v)$ is studied as a function on the Banach algebra Lip(X,d) o...
We survey recent results on the structure of the range of the derivative of a smooth real valued fun...
We introduce a domain-theoretic framework for differential calculus. We define the set of primitive ...
We introduce a typed lambda calculus in which real numbers, real functions, and in particular contin...
This thesis investigates the properties and applications of derivatives of functions whose domain an...
Abstract. Clarke’s generalized derivative f0(x, v) is studied as a function on the Banach algebra Li...
The Clarke derivative of a locally Lipschitz function is defined by f<sup>o</sup>(x;v):=[formula can...
AbstractThis paper considers Fréchet differentiability almost everywhere in the sense of category of...
Sorry, this article is being rewritten. Please email the author to be informed about its availabilit...
Abstract. We prove that if f is a real valued lower semicontinuous function on a Banach space X and ...