On kR-spaces and sR-spaces
Abstract
We give new characterizations of spaces X which are kR-spaces or sR-spaces. Applying the obtained results we provide some sufficient and necessary conditions on X for which Cp(X) is a kR-space or an sR-space. It is proved that Cp(X) is a kR-space for any space X with one non-isolated point; if, in addition, |X| is not sequential, then Cp(X) is even an sR-space. Under (CH), it is shown that there exists a separable metrizable space X such that Cp(X) is an Ascoli space but not a kR-space.
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