Convex functions on complete noncompact manifolds : differentiable structure

Z. In this paper, we establish some new integral inequalities for convex functions by using the Riemann-Liouville operator of non integer order. For our results some classical

In the second section, we car- acterize those topological vector spaces for which certain convex functions are continuous — this is connected to the uniform boundedness theorem

Aggregation functions based on finitely additive set functions Similarly to the TOWA function, our approach consists of a convex combi- nation of membership functions of

existence on small convex domains in the Riemannian case, and when the Malliavin derivative process of the limit Z has a certain deterministic bound related to curvature,

In this paper we prove that a similar result holds in the Heisenberg group, by showing that every continuous H –convex function belongs to the class of functions whose second

THE STRUCTURE OF IDEALS IN THE BANACH ALGEBRA OF LIPSCHITZ FUNCTIONS OVER VALUED

In particular, our work extends the applications of the proximal point methods for solving constrained minimization problems with non- convex objective functions in Euclidean

We are concerned with the Lipschitz modulus of the optimal set mapping associated with canonically perturbed convex semi-infinite optimization problems.. Specifically, the paper