Compact perfect sets in weak analytic spaces

Abstxact: Denote by s \*thy countable infinite topological product of real B-W. Pi, result of Anderson and K.le@ states tit whenever C i9 a comp& subset of s, then s \ C is haraeomorphic with s. In this note we show that, for products of more than countabfiy many reaI Irines the &uation is completeI

It is proved that a weak\* compact subset A of scalar measures on a \_-algebra is weakly compact if and only if there exists a nonnegative scalar measure \* such that each measure in A is \*-continuous (such a measure \* is called a control measure for A). This result is then used to obtain a very g

In this paper, the concept of almost N-compactness in L-fuzzy topological spaces is introduced. The characterizations of almost N-compact sets are systematically discussed. It is showed that the fuzzy almost continuous image of an almost N-compact set is an almost N-compact set. It is proved that th