Models for short sequences of measures in the cofinality-ω constructible model

Abstract

We investigate the relation between C*, the model of sets constructible using first order logic augmented with the "cofinality-ω" quantifier, and "short" sequences of measures - sequences of measures of order 1, which are shorter than their minimum. We show that certain core models for short sequences of measures are contained in C*; we compute C* in a model of the form L[U] where U is a short sequence of measures, and in models of the form L[U][G] where G is generic for adding Prikry sequences to some of the measurables of U; and prove that if there is an inner model with a short sequence of measures of order type , then there is such an inner model in C*.