Viktoriya Brydun, Mykhailo Zarichnyi
Published 2019-04-18Version 1
The notion of max-min measure is a counterpart of the notion of max-plus measure (Maslov measure or idempotent measure). In this paper we consider the spaces of max-min measures on the compact Hausdorff spaces. It is proved that the obtained functor of max-min measures is isomorphic to the functor of max-plus (idempotent) measures considered by the second-named author. However, it turns out that the monads generated by these functors are not isomorphic.
Orders of $π$-bases
Chains of functions in $C(K)$-spaces
The Banach-Alaoglu theorem is equivalent to the Tychonoff theorem for compact Hausdorff spaces
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