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Fundamentalnaya i Prikladnaya Matematika, 2022, Volume 24, Issue 1, Pages 125–140
(Mi fpm1922)
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Subalgebras in semirings of continuous partial real-valued functions
E. M. Vechtomov, E. N. Lubyagina Vyatka State University, Vyatka, Russia
Abstract:
This paper refers to the theory of semirings of continuous numerical functions, which has been developed within functional algebra. The object of the investigation is semirings $CP(X)$ of continuous partial functions on topological spaces $X$ with the values in the topological field $\mathbf{R}$ of real numbers. The subject of study is the subalgebras of semirings $CP(X)$. Some properties of the lattices $A(X)$ of all possible subalgebras and $A_1(X)$ of all subalgebras with identity are considered. The structure of atoms and preatoms in lattices $A_1(X)$ is clarified. This allowed us to solve the problem of the absolute determinability of $T_1$-spaces $X$ by each of the lattices $A_1(X)$ and $A_1(X)$.
Citation:
E. M. Vechtomov, E. N. Lubyagina, “Subalgebras in semirings of continuous partial real-valued functions”, Fundam. Prikl. Mat., 24:1 (2022), 125–140; J. Math. Sci., 269:5 (2023), 697–707
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https://www.mathnet.ru/eng/fpm1922 https://www.mathnet.ru/eng/fpm/v24/i1/p125
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Abstract page: | 119 | Full-text PDF : | 31 | References: | 32 |
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