The ring of real-valued functions on a frame
In this paper, we define and study the notion of the real-valued functions on a frame $L$. We show that $F(L) $, consisting of all frame homomorphisms from the power set of $mathbb{R}$ to a frame $ L$, is an $f$-ring, as a generalization of all functions from a set $X$ into $mathbb R$. Also, we show...
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Shahid Beheshti University
2016-07-01
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| Series: | Categories and General Algebraic Structures with Applications |
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| Online Access: | http://www.cgasa.ir/article_14685_3fb4a5800764dc102f3cbb565968e45d.pdf |
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doaj-86acda47c4824a018a170880b33eb25a2020-11-24T22:27:31ZengShahid Beheshti UniversityCategories and General Algebraic Structures with Applications2345-58532345-58612016-07-01518510214685The ring of real-valued functions on a frameAbolghasem Karimi Feizabadi0Ali Akbar Estaji1Mohammad Zarghani2Department of Mathematics, Gorgan Branch, Islamic Azad University, Gorgan, Iran.Faculty of Mathematics and Computer Sciences, Hakim Sabzevari University, Sabzevar, Iran.Faculty of Mathematics and Computer Sciences, Hakim Sabzevari University, Sabzevar, Iran.In this paper, we define and study the notion of the real-valued functions on a frame $L$. We show that $F(L) $, consisting of all frame homomorphisms from the power set of $mathbb{R}$ to a frame $ L$, is an $f$-ring, as a generalization of all functions from a set $X$ into $mathbb R$. Also, we show that $F(L) $ is isomorphic to a sub-$f$-ring of $mathcal{R}(L)$, the ring of real-valued continuous functions on $L$. Furthermore, for every frame $L$, there exists a Boolean frame $B$ such that $F(L)$ is a sub-$f$-ring of $ F(B)$.http://www.cgasa.ir/article_14685_3fb4a5800764dc102f3cbb565968e45d.pdfFrame$f$-ringRing of real-valued functions |
| collection |
DOAJ |
| language |
English |
| format |
Article |
| sources |
DOAJ |
| author |
Abolghasem Karimi Feizabadi Ali Akbar Estaji Mohammad Zarghani |
| spellingShingle |
Abolghasem Karimi Feizabadi Ali Akbar Estaji Mohammad Zarghani The ring of real-valued functions on a frame Categories and General Algebraic Structures with Applications Frame $f$-ring Ring of real-valued functions |
| author_facet |
Abolghasem Karimi Feizabadi Ali Akbar Estaji Mohammad Zarghani |
| author_sort |
Abolghasem Karimi Feizabadi |
| title |
The ring of real-valued functions on a frame |
| title_short |
The ring of real-valued functions on a frame |
| title_full |
The ring of real-valued functions on a frame |
| title_fullStr |
The ring of real-valued functions on a frame |
| title_full_unstemmed |
The ring of real-valued functions on a frame |
| title_sort |
ring of real-valued functions on a frame |
| publisher |
Shahid Beheshti University |
| series |
Categories and General Algebraic Structures with Applications |
| issn |
2345-5853 2345-5861 |
| publishDate |
2016-07-01 |
| description |
In this paper, we define and study the notion of the real-valued functions on a frame $L$. We show that $F(L) $, consisting of all frame homomorphisms from the power set of $mathbb{R}$ to a frame $ L$, is an $f$-ring, as a generalization of all functions from a set $X$ into $mathbb R$. Also, we show that $F(L) $ is isomorphic to a sub-$f$-ring of $mathcal{R}(L)$, the ring of real-valued continuous functions on $L$. Furthermore, for every frame $L$, there exists a Boolean frame $B$ such that $F(L)$ is a sub-$f$-ring of $ F(B)$. |
| topic |
Frame $f$-ring Ring of real-valued functions |
| url |
http://www.cgasa.ir/article_14685_3fb4a5800764dc102f3cbb565968e45d.pdf |
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