Abstract
The notion of the resolvability of a topological space was introduced by E. Hewitt (8). Recently it was understood that this no- tion is also important in the study of !-primitives, especially in the case of nonmetrizable spaces. In the present paper a criterion for the resolvability of a topological space at a point (\local resolvability) is given. This criterion, stated in terms of oscillation and quasicontinuity, permits to conclude, for instance, that on irresolvable spaces no posi- tive continuous real-valued function has an !-primitive. The result is strenghtened in the case of SI-spaces. It is also shown that every non- negative upper semicontinuous function on a resolvable Baire space has an !-primitive.
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