The weakly compact reflection principle need not imply a high order of weak compactness

Abstract

The weakly compact reflection principle Reflwc() states that is a weakly compact cardinal and every weakly compact subset of has a weakly compact proper initial segment. The weakly compact reflection principle at implies that is an ω-weakly compact cardinal. In this article we show that the weakly compact reflection principle does not imply that is (ω+1)-weakly compact. Moreover, we show that if the weakly compact reflection principle holds at then there is a forcing extension preserving this in which is the least ω-weakly compact cardinal. Along the way we generalize the well-known result which states that if is a regular cardinal then in any forcing extension by -c.c. forcing the nonstationary ideal equals the ideal generated by the ground model nonstationary ideal; our generalization states that if is a weakly compact cardinal then after forcing with a `typical' Easton-support iteration of length the weakly compact ideal equals the ideal generated by the ground model weakly compact ideal.