| 1) If X is a regular 6- refinable space, then X is DC-like space if and only if A' is CSK-like space, thus the problem appeared in [2] is partly answered;2) If Xn is a regular Lindelof DC-like space for each n W, then fl Xn is an6JVLindelof space;3) A is a //-set of space X if and only if A is closed in Y whenever Y is a T? space, A is contained in an open set U of A' and U is embedded in Y , thus the question appeared in [15] is answered; Y C A, Y is countably //-set if and only if Y is closed in Z whenever Z is a T3 first countable space, Y is contained in an open set V of AT and V is embedded in Z; Y C X, Y is a countably //-bounded set if and only if Y is closed in every T3 first countable space Z in which X is embedded;4) An example is given to show that the main result of [21] and 3.2.14 of [23] should be considered again;5) Let X be a TI, S'-space and every point of X is (-set, if / : X -> Y is a closed onto map, then there is a cr-discrete subspace Z of V, such that f~l(y) is an ui -compact subset of X for every y € Y \ Z\6) If X is a regular fc-space with a a- HCP closed fc-network, then X is a hereditarily metalindelof space, thus the question appeared in [29] and [30] is answered; A normal sequential space with a a-HCP fc-network is a paracompact space;7) If X is a regular space, and X = U{.Yn : n ?N}, Xn has a |
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