The definability of the extender sequence E from E1 in L[E]

Abstract

Let M be a short extender mouse. We prove that if E∈ M and M satisfies "E is a countably complete short extender whose support is a cardinal θ and Hθ⊂eqUlt(V,E)", then E is in the extender sequence EM of M. We also prove other related facts, and use them to establish that if is an uncountable cardinal of M and +M exists in M then (H+)M satisfies the Axiom of Global Choice. We prove that if M satisfies the Power Set Axiom then EM is definable over the universe of M from the parameter X=EM1M, and M satisfies "every set is OD\X\". We also prove various local versions of this fact in which M has a largest cardinal, and a version for generic extensions of M. As a consequence, for example, the minimal proper class mouse with a Woodin limit of Woodin cardinals models "V=HOD". This adapts to many other similar examples. We also describe a simplified approach to Mitchell-Steel fine structure, which does away with the parameters un.