Tag Archives: Large Cardinals

A large cardinal in the constructible universe

Posted on February 16, 2012 by Assaf Rinot in categories: Blog, Expository.

In this post, we shall provide a proof of Silver’s theorem that the Erdos caridnal $κ (ω)$ relativizes to Godel’s constructible universe. First, recall some definitions. Given a function $f : [κ]^{< ω} \to μ$ , we say that $I \subseteq κ$ is a set of indiscernibles for … Continue reading →

Posted in Blog, Expository | Tagged Absoluteness, Erdos Cardinal, Large Cardinals | 10 Comments

On the consistency strength of the Milner-Sauer conjecture

Posted on September 26, 2011 by Assaf Rinot in categories: Publications, Singular Cardinals Combinatorics.

Abstract: In their paper from 1981, Milner and Sauer conjectured that for any poset $P$ , if $cf (P)$ is a singular cardinal $λ$ , then $P$ must contain an antichain of size $cf (λ)$ . The conjecture is consistent and known … Continue reading →

Posted in Publications, Singular Cardinals Combinatorics | Tagged 03E04, 03E05, 03E45, 03E55, 03E65, Large Cardinals, Open Access, Poset, Shelah's Strong Hypothesis, Singular cofinality, Singular Density | Leave a comment

Tag Archives: Large Cardinals

A large cardinal in the constructible universe

On the consistency strength of the Milner-Sauer conjecture

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