An Easton-like theorem for Zermelo-Fraenkel Set Theory without Choice

Abstract

We show that in Zermelo-Fraenkel Set Theory without the Axiom of Choice a surjectively modified continuum function θ() can take almost arbitrary values for all infinite cardinals. This choiceless version of Easton's Theorem is in sharp contrast to the situation in ZFC, where for singular cardinals , the value of 2 is strongly influenced by the behaviour of the continuum function below. Our construction can roughly be described as follows: In a ground model V ZFC + GCH with a "reasonable" function F: Card → Card on the infinite cardinals, a class forcing P is introduced, which blows up the power sets of all cardinals according to F . The eventual model N ZF is a symmetric extension by P such that θN() = F() holds for all .