English

Splitting number and the core model

Logic 2008-02-03 v1

Abstract

We can generalize the definition of {\it splitting number } s(κ)s(\kappa ) for κ\kappa uncountable regular: s(κ)=min{\CalS:\CalS\CalP(κ)aκκb\CalSab=ab=κ}s(\kappa )=min\{ |\Cal S|:\Cal S\subset \Cal P(\kappa ) \forall a\in \kappa ^\kappa \exists b\in \Cal S |a\cap b|=|a\setminus b|=\kappa\} However,κ>0\exists \kappa>\aleph_0 s(κ)>κ+s(\kappa )>\kappa ^+ becomes a considerable hypothesis,shown consistent from a supercompact.We show that it implies inner models of α:o(α)=α++\exists \alpha :o(\alpha )=\alpha ^{++}

Keywords

Cite

@article{arxiv.math/9210204,
  title  = {Splitting number and the core model},
  author = {Jindřich Zapletal},
  journal= {arXiv preprint arXiv:math/9210204},
  year   = {2008}
}