The definability of E in self-iterable mice

Abstract

Let M be a fine structural mouse and let F∈ M be such that M``F is a total extender'' and (M||lh(F),F) is a premouse. We show that it follows that F∈EM, where EM is the extender sequence of M. We also prove generalizations of this fact. Let M be a premouse with no largest cardinal and let be a sufficient iteration strategy for M. We prove that if M knows enough of M then EM is definable over the universe M of M, so if also M then M``V=HOD''. We show that this result applies in particular to M=Mnt|λ, where Mnt is the least non-tame mouse and λ is any limit cardinal of Mnt. We also show that there is no iterable bicephalus (N,E,F) for which E is type 2 and F is type 1 or 3. As a corollary, we deduce a uniqueness property for maximal L[E] constructions computed in iterable background universes.