1. Rings of continuous functions vanishing at infinity on a frame.
- Author
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Estaji, Ali Akbar and Mahmoudi Darghadam, Ahmad
- Subjects
INFINITY (Mathematics) ,HAUSDORFF spaces ,FUNCTION spaces ,TOPOLOGICAL spaces ,COMPACT spaces (Topology) ,MATHEMATICS - Abstract
Let C(X) denote the ring of all real-valued continuous functions on a topological space X; and C
∞ (X) be the subring of all functions C(X) which vanish at infinity. In [2], the paper "Rings of continuous functions vanishing at infinity," (Comment. Math. Univ. Carolin.45(3) (2004), 519–533), by A.R. Aliabad, F. Azarpanah, and M. Namdari, it is shown that for every completely regular Hausdorff space X, whenever C∞ (X) ≠ (0), then there exists a locally compact space Y such that C∞(X) ≅ C∞ (Y). In fact, the space Y may be considered as a nonempty open locally compact subspace of X. In the present paper, analogous results are derived in a pointfree context in which topological spaces are replaced by frames. [ABSTRACT FROM AUTHOR]- Published
- 2019
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