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| Authors: | M. Bell L. Shapiro P. Simon |
| Affiliation: | Department of Mathematics, University of Manitoba, Fort Garry Campus, Winnipeg, Canada R3T 2N2 ; Department of Mathematics, Academy of Labor and Social Relations, Lobachevskogo 90, Moscow, Russia 117454 ; Matematický Ústav, University Karlovy, Sokolovská 83, 18600 Praha 8, Czech Republic |
| Abstract: | Let  be the u{C}ech-Stone remainder  . We show that there exists a large class  of images of  such that whenever  is a subset of  of cardinality at most the continuum, then  is again an image of  . The class  contains all separable compact spaces, all compact spaces of weight at most  and all perfectly normal compact spaces. |
| Keywords: | $omega^*$ image product space compact |
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