Examples of strongly rigid countable (semi)Hausdorff spaces
Abstract
A topological space X is strongly rigid if each non-constant continuous map f:X X is the identity map of X. A Hausdorff topological space X is called Brown if for any nonempty open sets U,V⊂eq X the intersection U V is infinite. We prove that every second-countable Brown Hausdorff space X admits a stronger topology τ' such that X'=(X,τ') is a strongly rigid anticompact Brown space.This construction yields an example of a countable anticompact Hausdorff space X which is strongly rigid, which answers two problems posed at MathOverflow. By the same method we construct a strongly rigid k2-metrizable semi-Hausdorff space containing a non-closed compact subset, which answers two other problem posed at MathOverflow.
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