Club Chang's Conjecture

Abstract

Chang's Conjecture (CC) asserts that for every F:[ω2]<ω ω2, there exists an X that is closed under F such that |X|=ω1 and |X ω1| =ω. By classic results of Silver and Donder, CC is equiconsistent with an ω1-Erdos cardinal. Using stronger large cardinal assumptions (between o() = + and o() = ++), we prove that it is consistent to also require that X contains a closed unbounded set of ordinals in sup(X ω2). We denote this stronger principle Club-CC, and also show that, unlike CC, Club-CC implies failure of certain weak square principles.