Count(q) versus the Pigeon-Hole Principle

Authors

  • Søren Riis

DOI:

https://doi.org/10.7146/brics.v1i26.21640

Abstract

For each p <= 2 there exist a model M* of IDelta_{0}(alpha) which satisfies the Count(p) principle. Furthermore if p contain all prime factors of q there exist n, r in M* and a bijective map f in Set(M*) mapping {1, 2, ..., n} onto {1,2,...,n+q^r}.

A corollary is a complete classification of the Count(q) versus Count(p) problem. Another corollary solves an open question by M. Ajtai.

Downloads

Published

1994-08-03

How to Cite

Riis, S. (1994). Count(q) versus the Pigeon-Hole Principle. BRICS Report Series, 1(26). https://doi.org/10.7146/brics.v1i26.21640

Issue

No. 26 (1994): RS-26 Count(q) versus the Pigeon-Hole Principle

Section

Articles

License

Creative Commons License

Articles published in DAIMI PB are licensed under a Creative Commons Attribution-NonCommercial-NoDerivs 3.0 Unported License.