Add to ORKGWe provide a sufficient condition for an invertible (locally strongly) convex vector-valued function on $\mathbb{R}^N$ to have a (locally strongly) convex inverse. We show under suitable conditions that if the gradient of each component of the inverse has negative entries, then this inverse is (locally strongly) convex if the original is
Establecemos algunas desigualdades de tipo Hermite-Hadamard y Fejér para la clase de Funciones fuert...
This thesis contains two results. Firstly, we characterize locally convex spaces in which the theor...
Any finite, separately convex, positively homogeneous function on $\mathbb{R}^2$ is convex. This was...
AbstractThe main result in this paper is to establish some new characterizations of convex functions...
IWe derive C2 −characterizations for convex, strictly convex, as well as strongly convex functions o...
The main results of this paper give a connection between strong Jensen convexity and strong convexit...
A convex function defined on an open convex set is known to be continuous at every point of this se...
summary:In the first part of this paper, we prove that in a sense the class of bi-Lipschitz $\delta$...
International audienceThis paper provides sufficient conditions for any map L, that is strongly piec...
Definition (Strong convexity). A function f is said λ-strongly convex if the function f − λ2 ‖·‖2 is...
AbstractConvexity properties of the inverse of positive definite matrices and the Moore–Penrose inve...
AbstractWe give some necessary and sufficient conditions which completely characterize the strong an...
Abstract. The main aim of this paper is to give some counterexamples to global invertibility of loca...
This paper discusses the fifth coefficient approximation of the inverse strongly convex function. St...
Any function $$f$$ from $$(0,\infty )$$ onto $$(0,\infty )$$ which is decreasing and convex has an i...
Establecemos algunas desigualdades de tipo Hermite-Hadamard y Fejér para la clase de Funciones fuert...
This thesis contains two results. Firstly, we characterize locally convex spaces in which the theor...
Any finite, separately convex, positively homogeneous function on $\mathbb{R}^2$ is convex. This was...
AbstractThe main result in this paper is to establish some new characterizations of convex functions...
IWe derive C2 −characterizations for convex, strictly convex, as well as strongly convex functions o...
The main results of this paper give a connection between strong Jensen convexity and strong convexit...
A convex function defined on an open convex set is known to be continuous at every point of this se...
summary:In the first part of this paper, we prove that in a sense the class of bi-Lipschitz $\delta$...
International audienceThis paper provides sufficient conditions for any map L, that is strongly piec...
Definition (Strong convexity). A function f is said λ-strongly convex if the function f − λ2 ‖·‖2 is...
AbstractConvexity properties of the inverse of positive definite matrices and the Moore–Penrose inve...
AbstractWe give some necessary and sufficient conditions which completely characterize the strong an...
Abstract. The main aim of this paper is to give some counterexamples to global invertibility of loca...
This paper discusses the fifth coefficient approximation of the inverse strongly convex function. St...
Any function $$f$$ from $$(0,\infty )$$ onto $$(0,\infty )$$ which is decreasing and convex has an i...
Establecemos algunas desigualdades de tipo Hermite-Hadamard y Fejér para la clase de Funciones fuert...
This thesis contains two results. Firstly, we characterize locally convex spaces in which the theor...
Any finite, separately convex, positively homogeneous function on $\mathbb{R}^2$ is convex. This was...