Full normalization for transfinite stacks

Abstract

We describe the extension of normal iteration strategies with appropriate condensation properties to strategies for stacks of normal trees, with full normalization. Given a regular uncountable cardinal and an (m,+1)-iteration strategy for a premouse M, such that and M both have appropriate condensation properties, we extend to a strategy * for the optimal-(m,,+1)*-iteration game such that for all λ< and all stacks T=<Tα>α<λ via *, consisting of normal trees Tα, each of length <, there is a corresponding normal tree X via with MT∞=MX∞. Moreover, if there are no drops in model or degree along the main branches of these trees then the overall iteration maps iT:M MT∞ and iX:M MX∞ agree. The construction is the result of a combination of work of John Steel and of the author. We also establish some further useful properties of *, and use the methods to analyze the comparison of multiple iterates via a common such strategy.