More on the pressing down game
arXiv:0905.3913 · doi:10.1007/s00153-011-0227-x
Abstract
We investigate the pressing down game and its relation to the Banach Mazur game. In particular we show: Consistently, there is a nowhere precipitous normal ideal $I$ on $\aleph_2$ such that player nonempty wins the pressing down game of length $\aleph_1$ on $I$ even if player empty starts.