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A Sequence Convergence of 1 -Dimensional Subspace in a Normed Space
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Journal Article
A Sequence Convergence of 1 -Dimensional Subspace in a Normed Space
2018
Overview
In this paper, the researchers will be introduced the concept of a sequence convergence of 1 -dimensional subspaces (lines) in a normed space and shall discuss some properties of it. Furthermore, it will be proved a continuity property of angles among subspaces in inner product spaces. Finally, the notion of limit of a sequence of 2 -dimensional subspaces (planes) in a normed space is studied. The researchers also obtain a result which describe how the convergent of a sequence of lines is associated to the convergent of a sequence of planes in a normed space.
Publisher
IOP Publishing
Subject
