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Perfect cliques and |
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| Authors: | Wieslaw Kubis |
| Institution: | Department of Mathematics, University of Silesia, Katowice, Poland |
| Abstract: | A coloring of a set  is any subset  of ![$X]^N$](http://www.ams.org/proc/2003-131-02/S0002-9939-02-06584-X/gif-abstract0/img3.gif){kind=small} , where  is a natural number. We give some sufficient conditions for the existence of a perfect  -homogeneous set, in the case where  is  and  is a Polish space. In particular, we show that it is sufficient that there exist  -homogeneous sets of arbitrarily large countable Cantor-Bendixson rank. We apply our methods to show that an analytic subset of the plane contains a perfect  -clique if it contains any uncountable  -clique, where  is a natural number or  (a set  is a  -clique in  if the convex hull of any of its  -element subsets is not contained in  ). |
| Keywords: | Open ($G_\delta$) coloring perfect homogeneous set clique |
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