Paper Info
Title
Weak Convergence and Weak Convergence.
Abstract
In this article, we deal with weak convergence on sequences in real normed spaces, and weak* convergence on sequences in dual spaces of real normed spaces. In the first section, we proved some topological properties of dual spaces of real normed spaces. We used these theorems for proofs of Section 3. In Section 2, we defined weak convergence and weak* convergence, and proved some properties. By RNS_Real Mizar functor, real normed spaces as real number spaces already defined in the article [18], we regarded sequences of real numbers as sequences of RNS_Real. So we proved the last theorem in this section using the theorem (8) from [25]. In Section 3, we defined weak sequential compactness of real normed spaces. We showed some lemmas for the proof and proved the theorem of weak sequential compactness of reflexive real Banach spaces. We referred to [36], [23], [24] and [3] in the formalization.
Year
DOI
Venue
2015
10.1515/forma-2015-0019
FORMALIZED MATHEMATICS
Keywords
Field
DocType
normed linear spaces,Banach spaces,duality and reflexivity,weak topologies,weak* topologies
Discrete mathematics,Modes of convergence (annotated index),Reflexive space,Weak convergence,Interpolation space,Mathematical analysis,Real analysis,Eberlein–Šmulian theorem,Mathematics,Locally convex topological vector space,Modes of convergence
Journal
Volume
Issue
ISSN
23
3
1898-9934
Citations 
PageRank 
References 
0
0.34
3
Authors
3
Name
Order
Citations
PageRank
Keiko Narita14916.59
Yasunari Shidama216672.47
Noboru Endou37228.00