On the Maximal Ideals in the Banach Space of +Quasicontinuous Functions

On the Maximal Ideals in the Banach Space of +Quasicontinuous Functions

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Vajha Srinivasa Kumar

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V. Srinivasa Kumar

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On the Maximal Ideals in the Banach Space of +Quasicontinuous Functions

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Abstract

In this paper some interesting properties of + Quasicontinuous functions are presented. The maximal ideals in the Banach space of bounded real valued + Quasicontinuous functions defined on [0,1] are investigated.

Funding

No external funding was declared for this work.

Conflict of Interest

The authors declare no conflict of interest.

Ethical Approval

No ethics committee approval was required for this article type.

Data Availability

Not applicable for this article.

How to Cite This Article

Vajha Srinivasa Kumar. 2013. \u201cOn the Maximal Ideals in the Banach Space of +Quasicontinuous Functions\u201d. Global Journal of Science Frontier Research - F: Mathematics & Decision GJSFR-F Volume 13 (GJSFR Volume 13 Issue F8): .

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GJSFR Volume 13 Issue F8
Pg. 1- 10

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Journal Specifications

Crossref Journal DOI 10.17406/GJSFR

Print ISSN 0975-5896

e-ISSN 2249-4626

Keywords

+quasicontinuity bounded linear functional cliquish function compact hausdorff space maximal ideal space of maximal ideals weak* topology

Submission ReceivedJuly 22, 2013
Peer Review Double Blind
Handling Editor
Accepted August 13, 2013
Published August 25, 2013

Version of record

v1.2

Issue date

October 6, 2013

Language

en

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Article Matrices

Total Score: 101

Country: India

Subject: Global Journal of Science Frontier Research - F: Mathematics & Decision

Authors: V. Srinivasa Kumar (PhD/Dr. count: 0)

View Count (all-time): 101

Total Views (Real + Logic): 4718

Total Downloads (simulated): 2400

Publish Date: 2013 10, Sun

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Total Views: 4718

Total Downloads: 2400

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Published Article

In this paper some interesting properties of + Quasicontinuous functions are presented. The maximal ideals in the Banach space of bounded real valued + Quasicontinuous functions defined on [0,1] are investigated.

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