Weak relatively uniform convergences on MV-algebras |
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Authors: | Štefan Černák Ján Jakubík |
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Affiliation: | 1. Mathematical Institute, Slovak Academy of Sciences, Gre?ákova 6, Ko?ice, Slovakia
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Abstract: | Weak relatively uniform convergences (wru-convergences, for short) in lattice ordered groups have been investigated in previous authors’ papers. In the present article, the analogous notion for MV-algebras is studied. The system s(A) of all wru-convergences on an MV-algebra A is considered; this system is partially ordered in a natural way. Assuming that the MV-algebra A is divisible, we prove that s(A) is a Brouwerian lattice and that there exists an isomorphism of s(A) into the system s(G) of all wru-convergences on the lattice ordered group G corresponding to the MV-algebra A. Under the assumption that the MV-algebra A is archimedean and divisible, we investigate atoms and dual atoms in the system s(A). |
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