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Open Accesshttps://doi.org/10.1016/s1571-0661(05)80277-4
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Cite Publication Date: Jan 1, 1999 | |
 Citations: 2 |  License type: cc-by-nc-nd |
Affiliation: York University
The hyperspaces of closed and of compact subsets of an ultrametric space endowed with the Hausdorff metric are studied. Both give rise to a functor on the category of ultrametric spaces and nonexpansive functions. It is shown that the former functor does not have a terminal coalgebra and that the latter does.
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