Chang's Conjecture and semiproperness of nonreasonable posets

Abstract

Let Q denote the poset which adds a Cohen real then shoots a club through the complement of ( [ω2]ω )V with countable conditions. We prove that the version of Strong Chang's Conjecture from MR2965421 implies semiproperness of Q, and that semiproperness of Q---in fact semiproperness of any poset which is sufficiently nonreasonable in the sense of Foreman-Magidor~MR1359154---implies the version of Strong Chang's Conjecture from MR2723878 and MR1261218. In particular, semiproperness of Q has large cardinal strength, which answers a question of Friedman-Krueger~MR2276627. One corollary of our work is that the version of Strong Chang's Conjecture from MR2965421 does not imply the existence of a precipitous ideal on ω1.