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https://doi.org/10.20310/1810-0198-2019-24-125-33-38
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Cite Publication Date: Jan 1, 2019 | |
 Citations: 3 |
Affiliation: Peoples' Friendship University of Russia
For arbitrary (q1, q2) -quasimetric space, it is proved that there exists a function f, such that f -triangle inequality is more exact than any (q1, q2) -triangle inequality. It is shown that this function f is the least one in the set of all concave continuous functions g for which g -triangle inequality hold.
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