On the Stability of the Parallel Sum of Maximal Monotone Operators

In this paper we give some conditions under which T q Ѩ f is maximal monotone Ž . in the Banach space X not necessarily reflexive , where T is a monotone operator from X into X \* and Ѩ f is the subdifferential of a proper lower semicontinuous Ä 4 convex function f, from X into ‫ޒ‬ j qϱ . We also gi

We provide sufficient conditions for a sequence of positive linear approximation operators, L n ( f, x), converging to f (x) from above to imply the convexity of f. We show that, for the convolution operators of Feller type, K n ( f, x), generated by a sequence of iid random variables taking values

Let S be the class of functions f z which are analytic and univalent in the open Ž . X Ž . unit disk U with f 0 s 0 and f 0 s 1. The nth partial sums of the Libera Ž . Ž . Ž . integral operator F z for f z g S are denoted by S z, F . In the present paper, n Ž . the starlikeness property of S z, F i