Ordinal definability in L[E]

Abstract

Let M be a tame mouse modelling ZFC. We show that M satisfies "V=HODx for some real x", and that the restriction E[ω1M,ORM) of the extender sequence EM of M to indices above ω1M is definable without parameters over the universe of M. We show that M has universe HODM[X], where X=M|ω1M is the initial segment of M of height ω1M (including EMω1M), and that HODM is the universe of a premouse over some t⊂eqω2M. We also show that M has no proper grounds via strategically σ-closed forcings. We then extend some of these results partially to non-tame mice, including a proof that many natural -minimal mice model "V=HOD", assuming a certain fine structural hypothesis whose proof has almost been given elsewhere.