Certain geometric structure of $\Lambda$-sequence spaces
Functional Analysis
2017-12-27 v1
Abstract
The -sequence spaces for and its generalization for , is introduced. The James constants and strong -th James constants of for is determined. It is proved that generalized -sequence space is embedded isometrically in the Nakano sequence space of finite dimensional Euclidean space . Hence it follows that sequence spaces and possesses the uniform Opial property, property of Rolewicz and weak uniform normal structure. Moreover, it is established that possesses the coordinate wise uniform Kadec-Klee property. Further necessary and sufficient conditions for element to be an extreme point of are derived. Finally, estimation of von Neumann-Jordan and James constants of two dimensional -sequence space is being carried out.
Cite
@article{arxiv.1612.01519,
title = {Certain geometric structure of $\Lambda$-sequence spaces},
author = {Atanu Manna},
journal= {arXiv preprint arXiv:1612.01519},
year = {2017}
}
Comments
18 pages