English

PCF and infinite free subsets

Logic 2009-09-25 v1

Abstract

We give another proof that for every lambda >= beth_omega for every large enough regular kappa < beth_omega we have lambda^{[kappa]}= lambda, dealing with sufficient conditions for replacing beth_omega by aleph_omega. In section 2 we show that large pcf(a) implies existence of free sets. An example is that if pp(aleph_omega)> aleph_{omega_1} then for every algebra M of cardinality aleph_omega with countably many functions, for some a_n in M (for n< omega) we have a_n notin cl_M({a_l: l not= n, l<omega}). Then we present results complementary to those of section 2 (but not close enough): if IND(mu,sigma) (in every algebra with universe lambda and <= sigma functions there is an infinite independent subset) then for no distinct regular lambda_i in Reg backslash mu^+ (for i< kappa) does prod_{i< kappa} lambda_i/[kappa]^{<= sigma} have true cofinality. We look at IND(< J^{bd}_{kappa_n}:n<omega >) and more general version, and from assumptions as in section 2 get results even for the non stationary ideal. Lastly, we deal with some other measurements of [lambda]^{>= theta} and give an application by a construction of a Boolean Algebra.

Keywords

Cite

@article{arxiv.math/9807177,
  title  = {PCF and infinite free subsets},
  author = {Saharon Shelah},
  journal= {arXiv preprint arXiv:math/9807177},
  year   = {2009}
}