Stationary Reflection and the failure of SCH

Abstract

In this paper we prove that from large cardinals it is consistent that there is a singular strong limit cardinal such that the singular cardinal hypothesis fails at and every collection of fewer than cf() stationary subsets of + reflects simultaneously. For cf() > ω, this situation was not previously known to be consistent. Using different methods, we reduce the upper bound on the consistency strength of this situation for cf() = ω to below a single partially supercompact cardinal. The previous upper bound of infinitely many supercompact cardinals was due to Sharon.