Zobrazeno 1 - 10
of 108
pro vyhledávání: '"Alexandroff extension"'
Publikováno v:
ANALYSIS AND APPLICATIONS
We first construct a space $\mathcal{W}\left( \mathbb{R}_{\text{c}} ^{n}\right) $ whose elements are test functions defined in $\mathbb{R} _{\text{c}}^{n}=\mathbb{R}^{n}\cup\left\{ \mathbf{\infty}\right\} ,$ the one point compactification of $\mathbb
Autor:
Sang-Eon Han
Publikováno v:
Topology and its Applications. 264:201-209
The present paper studies two topologies of the quotient spaces related to the Alexandroff one point compactification of the Marcus-Wyse (M-, for brevity) topological plane. The topologies are exactly proved to be the cofinite particular point and th
Autor:
Rajeshwari Majumdar, Suman Majumdar
Publikováno v:
Calcutta Statistical Association Bulletin. 71:49-61
The asymptotic solution to the problem of comparing the means of two heteroscedastic populations, based on two random samples from the populations, hinges on the pivot underpinning the construction of the confidence interval and the test statistic be
Publikováno v:
Afrika Matematika. 30:345-353
The notions of a s- $$T_1$$ space, an almost generalized Hausdorff space, and a $$\mu $$ -locally compact space in the context of generalized topological spaces are introduced. Properties in relation to these spaces are established. Finally, a versio
Autor:
Sang-Eon Han, Selma Özçağ
Publikováno v:
Mathematics
Volume 8
Issue 4
Mathematics, Vol 8, Iss 599, p 599 (2020)
Volume 8
Issue 4
Mathematics, Vol 8, Iss 599, p 599 (2020)
The present paper is concerned with the Alexandroff one point compactification of the Marcus-Wyse (M-, for brevity) topological space ( Z 2 , &gamma
) . This compactification is called the infinite M-topological sphere and denoted by ( ( Z 2 ) *
) . This compactification is called the infinite M-topological sphere and denoted by ( ( Z 2 ) *
Publikováno v:
Recent Advances in Intelligent Information Systems and Applied Mathematics ISBN: 9783030341510
ICITAM
ICITAM
In this paper we introduce a notion of soft filter and its convergence in redefined soft topological spaces. The relation of convergence between soft nets and soft filters is studied. Finally analogue of one point compactification is dealt with.
Externí odkaz:
https://explore.openaire.eu/search/publication?articleId=doi_________::e14702a0d31455a5c70fef5d0c321dd8
https://doi.org/10.1007/978-3-030-34152-7_53
https://doi.org/10.1007/978-3-030-34152-7_53
Autor:
Sang-Eon Han, Il-Kang Na
Publikováno v:
Topology and its Applications. 241:333-344
In this paper, after discussing the one point compactification of the Khalimsky line (resp. the Khalimsky plane), denoted by ( Z ⁎ , κ ⁎ ) (resp. ( ( Z 2 ) ⁎ , ( κ 2 ) ⁎ ) ), we study various properties of these compactifications associated
Publikováno v:
Quaestiones Mathematicae; Vol 40, No 1 (2017); 17-28
Alexandroff topologies play an enigmatic role in topology. An important family of Alexandroff topologies are the functional Alexandroff spaces introduced by Shirazi and Golestani, and called primal topologies by O. Echi. The primal topology P(ƒ) on
Autor:
Hisham B. Mahdi, Heba A. Othman
Publikováno v:
Pure Mathematical Sciences. 6:1-10
Autor:
Dünya Karapinar, Ali Arslan Özkurt
Publikováno v:
Volume: 43, Issue: 4 2025-2031
Turkish Journal of Mathematics
Turkish Journal of Mathematics
Let$\ X$ be a locally compact and noncompact$\ G-$space with a compact group $G$. In this paper, we give some useful description of a compactification of the orbit space $X/G$ when it is an orbit space of a $G-$compactification of $X$. As an applicat
Externí odkaz:
https://explore.openaire.eu/search/publication?articleId=doi_dedup___::2e6ad258d4e03ad65fd708374eefafaf
https://hdl.handle.net/20.500.12605/10042
https://hdl.handle.net/20.500.12605/10042