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Cited 2 time in webofscience Cited 2 time in scopus
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Topological Analysis of Fibrations in Multidimensional (C, R) Spaceopen access

Authors
Bagchi, Susmit
Issue Date
Dec-2020
Publisher
MDPI
Keywords
topological spaces; fiber bundles; group; projection; norm
Citation
SYMMETRY-BASEL, v.12, no.12, pp 1 - 12
Pages
12
Indexed
SCIE
SCOPUS
Journal Title
SYMMETRY-BASEL
Volume
12
Number
12
Start Page
1
End Page
12
URI
https://scholarworks.gnu.ac.kr/handle/sw.gnu/5875
DOI
10.3390/sym12122049
ISSN
2073-8994
2073-8994
Abstract
A holomorphically fibred space generates locally trivial bundles with positive dimensional fibers. This paper proposes two varieties of fibrations (compact and non-compact) in the non-uniformly scalable quasinormed topological (C, R) space admitting cylindrically symmetric continuous functions. The projective base space is dense, containing a complex plane, and the corresponding surjective fiber projection on the base space can be fixed at any point on real subspace. The contact category fibers support multiple oriented singularities of piecewise continuous functions within the topological space. A composite algebraic operation comprised of continuous linear translation and arithmetic addition generates an associative magma in the non-compact fiber space. The finite translation is continuous on complex planar subspace under non-compact projection. Interestingly, the associative magma resists transforming into a monoid due to the non-commutativity of composite algebraic operation. However, an additive group algebraic structure can be admitted in the fiber space if the fibration is a non-compact variety. Moreover, the projection on base space supports additive group structure, if and only if the planar base space passes through the real origin of the topological (C, R) space. The topological analysis shows that outward deformation retraction is not admissible within the dense topological fiber space. The comparative analysis of the proposed fiber space with respect to Minkowski space and Seifert fiber space illustrates that the group algebraic structures in each fiber spaces are of different varieties. The proposed topological fiber bundles are rigid, preserving sigma-sections as compared to the fiber bundles on manifolds.
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Bagchi, Susmit
IT공과대학 (소프트웨어공학과)
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