Minmax bornologies
Abstract
A bornology B on a set X is called minmax if the smallest and the largest coarse structures on X compatible with B coincide. We prove that B is minmax if and only if the family B=\p∈β X:\X B:B∈ B\⊂ p\ consists of ultrafilters which are pairwise non-isomorphic via B-preserving bijections of X. Also we construct a minmax bornology B on ω such that the set B is infinite. We deduce this result from the existence of a closed infinite subset in βω that consists of pairwise non-isomorphic ultrafilters.
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