On non-topologizable semigroups
Abstract
We find anti-isomorphic submonoids C+(a,b) and C-(a,b) of the bicyclic monoid C(a,b) with the following properties: every Hausdorff left-continuous (right-continuous) topology on C+(a,b) (C-(a,b)) is discrete and there exists a compact Hausdorff topological monoid S which contains C+(a,b) (C-(a,b)) as a submonoid. Also, we construct a non-discrete right-continuous (left-continuous) topology τp+ (τp-) on the semigroup C+(a,b) (C-(a,b)) which is not left-continuous (right-continuous).
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