Characterizing the powerset by a complete (Scott) sentence

Abstract

This paper is part II of a study on cardinals that are characterizable by a Scott sentence, continuing the work from http://arxiv.org/abs/1007.2426v1. A cardinal is characterized by a Scott sentence φM, if φM has a model of size , but no model of +. The main question in this paper is the following: Are the characterizable cardinals closed under the powerset operation? We prove that if β is characterized by a Scott sentence, then 2β+β1 is (homogeneously) characterized by a Scott sentence, for all 0<β1<ω1. So, the answer to the above question is positive, except the case β1=0 which remains open. As a consequence we derive that if αβ and β is characterized by a Scott sentence, then α+α1β+β1 is also characterized by a Scott sentence, for all α1<ω1 and 0<β1<ω1. Whence, depending on the model of ZFC, we see that the class of characterizable and homogeneously characterizable cardinals is much richer than previously known. Several open questions are also mentioned at the end.