Switch to: Citations

References in:

Towers in ω omega and omega ω

Peter Lars Dordal

Annals of Pure and Applied Logic 45 (3):247 (1989)

Add references

You must login to add references.

Adjoining dominating functions.James E. Baumgartner & Peter Dordal - 1985 - Journal of Symbolic Logic 50 (1):94-101.details If dominating functions in ω ω are adjoined repeatedly over a model of GCH via a finite-support c.c.c. iteration, then in the resulting generic extension there are no long towers, every well-ordered unbounded family of increasing functions is a scale, and the splitting number s (and hence the distributivity number h) remains at ω 1. Download Export citation Bookmark 21 citations
Powers of regular cardinals.William B. Easton - 1970 - Annals of Mathematical Logic 1 (2):139.details Download Export citation Bookmark 73 citations
A model in which the base-matrix tree cannot have cofinal branches.Peter Lars Dordal - 1987 - Journal of Symbolic Logic 52 (3):651-664.details A model of ZFC is constructed in which the distributivity cardinal h is 2 ℵ 0 = ℵ 2 , and in which there are no ω 2 -towers in [ω] ω . As an immediate corollary, it follows that any base-matrix tree in this model has no cofinal branches. The model is constructed via a form of iterated Mathias forcing, in which a mixture of finite and countable supports is used. Download Export citation Bookmark 6 citations

1