Majorants and Extreme Points of Unit Balls in Bernstein Spaces期刊界 All Journals 搜尽天下杂志传播学术成果专业期刊搜索期刊信息化学术搜索

按检索

Majorants and Extreme Points of Unit Balls in Bernstein Spaces

Authors:	Norvidas S

Abstract:	The Bernstein space B ^p () (1 $\leqslant p \leqslant \infty ,\sigma >$ 0) is the set of functions from L ^p( $\mathbb{R}$ ) having Fourier transforms (in the sense of generalized functions) with supports in the compact segment - , ]. Every function f $\in B^p (\sigma )$ has an analytic continuation onto the complex plane, which is an entire function of exponential type . The spaces B ^p ()\, are conjugate Banach spaces. Therefore, the closed unit ball $\mathcal{D}(B^p (\sigma ))$ in B ^p () has a rich set of extreme (boundary) points: $\mathcal{D}(B^p (\sigma ))$ coincides with the weakly ^* closed convex hull of its extreme points. Since, for 1< p< , B ^p () is a uniformly convex space, only the balls $\mathcal{D}(B^1 (\sigma ))$ and $\mathcal{D}(B^\infty (\sigma ))$ have nontrivially arranged sets of extreme points. In this paper, in terms of zeros of entire functions, we obtain necessary and sufficient conditions of extremeness for functions from $\mathcal{D}(B^1 (\sigma ))$ .

Keywords:	Bernstein spaces entire functions of exponential type majorants extreme points
本文献已被 SpringerLink 等数据库收录！