中文

The cardinal characteristic for relative gamma-sets

逻辑 2007-05-23 v1 一般拓扑

摘要

For XX a separable metric space define \pp(X)\pp(X) to be the smallest cardinality of a subset ZZ of XX which is not a relative \ga\ga-set in XX, i.e., there exists an \om\om-cover of XX with no \ga\ga-subcover of ZZ. We give a characterization of \pp(2\om)\pp(2^\om) and \pp(\om\om)\pp(\om^\om) in terms of definable free filters on \om\om which is related to the psuedointersection number \pp\pp. We show that for every uncountable standard analytic space XX that either \pp(X)=\pp(2\om)\pp(X)=\pp(2^\om) or \pp(X)=\pp(\om\om)\pp(X)=\pp(\om^\om). We show that both of following statements are each relatively consistent with ZFC: (a) \pp=\pp(\om\om)<\pp(2\om)\pp=\pp(\om^\om) < \pp(2^\om) and (b) \pp<\pp(\om\om)=\pp(2\om)\pp < \pp(\om^\om) =\pp(2^\om)

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引用

@article{arxiv.math/0405473,
  title  = {The cardinal characteristic for relative gamma-sets},
  author = {Arnold W. Miller},
  journal= {arXiv preprint arXiv:math/0405473},
  year   = {2007}
}