English

Gap Forcing

Logic 2007-05-23 v2

Abstract

Many of the most common reverse Easton iterations found in the large cardinal context, such as the Laver preparation, admit a gap at some small delta in the sense that they factor as P*Q, where P has size less than delta and Q is forced to be delta-strategically closed. In this paper, generalizing the Levy-Solovay theorem, I show that after such forcing, every embedding j:V[G]-->M[j(G)] in the extension which satisfies a mild closure condition is the lift of an embedding j:V-->M in the ground model. In particular, every ultrapower embedding in the extension lifts an embedding from the ground model and every measure in the extension which concentrates on a set in the ground model extends a measure in the ground model. It follows that gap forcing cannot create new weakly compact cardinals, measurable cardinals, strong cardinals, Woodin cardinals, strongly compact cardinals, supercompact cardinals, almost huge cardinals, huge cardinals, and so on.

Keywords

Cite

@article{arxiv.math/9808011,
  title  = {Gap Forcing},
  author = {Joel David Hamkins},
  journal= {arXiv preprint arXiv:math/9808011},
  year   = {2007}
}

Comments

16 pages. Submitted to the Journal of Mathematical Logic. The up-dated version includes an expanded introduction, which sets the main theorem in the historical context of the Levy-Solovay Theorem, and various other small improvements