Blowing up the power of a singular cardinal of uncountable cofinality with collapses

Abstract

The Singular Cardinal Hypothesis (SCH) is one of the most classical combinatorial principles in set theory. It says that if is singular strong limit, then 2=+. We prove that given a singular cardinal of cofinality η in the ground model, which is a limit of suitable large cardinals, and η+=γ, then there is a forcing extension which preserves cardinals and cofinalities up to and including η, such that becomes γ+η, and SCH fails at . Furthermore, if η is not an -fixed point, then in our model, SCH fails at η. Our large cardinal assumption is below the existence of a Woodin cardinal. In our model we also obtain a very good scale.