C(X) determines X - an inherent theory
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C(X) determines X - an inherent theory
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| dc.contributor.author | Mitra, Biswajit
|
es_ES |
| dc.contributor.author | Das, Sanjib
|
es_ES |
| dc.date.accessioned | 2023-05-02T06:18:53Z | |
| dc.date.available | 2023-05-02T06:18:53Z | |
| dc.date.issued | 2023-04-05 | |
| dc.identifier.issn | 1576-9402 | |
| dc.identifier.uri | http://hdl.handle.net/10251/193020 | |
| dc.description.abstract | [EN] One of the fundamental problem in rings of continuous function is to extract those spaces for which C(X) determines X, that is to investigate X and Y such that C(X) isomorphic with C(Y ) implies X homeomorphic with Y. The development started back from Tychonoff who first pointed out inevitability of Tychonoff space in this category of problem. Later S. Banach and M. Stone proved independently with slight variance, that if X is compact Hausdorff space, C(X) also determine X. Their works were maximally extended by E. Hewitt by introducing realcompact spaces and later Melvin Henriksen and Biswajit Mitra solved the problem for locally compact and nearly realcompact spaces. In this paper we tried to develop an inherent theory of this problem to cover up all the works in the literature introducing a notion so called P-compact spaces. | es_ES |
| dc.language | Inglés | es_ES |
| dc.publisher | Universitat Politècnica de València | es_ES |
| dc.relation.ispartof | Applied General Topology | es_ES |
| dc.rights | Reconocimiento - No comercial - Sin obra derivada (by-nc-nd) | es_ES |
| dc.subject | Nearly realcompact | es_ES |
| dc.subject | Real maximal ideal | es_ES |
| dc.subject | SRM ideal | es_ES |
| dc.subject | Realcompact | es_ES |
| dc.subject | P-maximal ideal | es_ES |
| dc.subject | P-compact space | es_ES |
| dc.subject | Structure space | es_ES |
| dc.title | C(X) determines X - an inherent theory | es_ES |
| dc.type | Artículo | es_ES |
| dc.identifier.doi | 10.4995/agt.2023.17569 | |
| dc.rights.accessRights | Abierto | es_ES |
| dc.description.bibliographicCitation | Mitra, B.; Das, S. (2023). C(X) determines X - an inherent theory. Applied General Topology. 24(1):83-93. https://doi.org/10.4995/agt.2023.17569 | es_ES |
| dc.description.accrualMethod | OJS | es_ES |
| dc.relation.publisherversion | https://doi.org/10.4995/agt.2023.17569 | es_ES |
| dc.description.upvformatpinicio | 83 | es_ES |
| dc.description.upvformatpfin | 93 | es_ES |
| dc.type.version | info:eu-repo/semantics/publishedVersion | es_ES |
| dc.description.volume | 24 | es_ES |
| dc.description.issue | 1 | es_ES |
| dc.identifier.eissn | 1989-4147 | |
| dc.relation.pasarela | OJS\17569 | es_ES |
| dc.description.references | R. L. Blair and E. K. van Douwen, Nearly realcompact spaces, Topology Appl. 47, no. 3 (1992), 209-221. https://doi.org/10.1016/0166-8641(92)90031-T | es_ES |
| dc.description.references | H. L. Byun and S. Watson, Prime and maximal ideals in subrings of C(X), Topology Appl. 40 (1991), 45-62. https://doi.org/10.1016/0166-8641(91)90057-S | es_ES |
| dc.description.references | P. P. Ghosh and B. Mitra, On Hard pseudocompact spaces, Quaestiones Mathematicae 35 (2012), 1-17. https://doi.org/10.2989/16073606.2012.671158 | es_ES |
| dc.description.references | L. Gillman and M. Jerison, Rings of Continuous Functions, University Series in Higher Math, Van Nostrand, Princeton, New Jersey, 1960. https://doi.org/10.1007/978-1-4615-7819-2 | es_ES |
| dc.description.references | M. Henriksen and B. Mitra, C(X) can sometimes determine X without X being realcompact, Comment. Math. Univ. Carolina 46, no. 4 (2005), 711-720. | es_ES |
| dc.description.references | M. Henriksen and M. Rayburn, On nearly pseudocompact spaces, Topology Appl. 11 (1980), 161-172. https://doi.org/10.1016/0166-8641(80)90005-X | es_ES |
| dc.description.references | E. Hewitt, Rings of real valued continuous functions, Trans. Amer. Math. Soc. 64 (1948), 45-99. https://doi.org/10.1090/S0002-9947-1948-0026239-9 | es_ES |
| dc.description.references | B. Mitra and S. K. Acharyya, Characterizations of nearly pseudocompact spaces and related spaces, Topology Proceedings 29, no. 2 (2005), 577-594. | es_ES |
| dc.description.references | M. C. Rayburn, On hard sets, General Topology and its Applications 6 (1976), 21-26. https://doi.org/10.1016/0016-660X(76)90004-0 | es_ES |
| dc.description.references | L. Redlin and S. Watson, Maximal ideals in subalgebras of C(X), Proc. Amer. Math Soc. 100, no. 4 (1987), 763-766. https://doi.org/10.1090/S0002-9939-1987-0894451-2 | es_ES |
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