Universal Graphs at ω1+1 and Set-theoretic Geology

Abstract

This thesis consists of two parts: the construction of a jointly universal family of graphs, and then an exploration of set-theoretic geology. Firstly we shall construct a model in which 2ω1=2ω1+1=ω1+3 but there is a jointly universal family of size ω1+2 of graphs on ω1+1. We take a supercompact cardinal and will use Radin forcing with interleaved collapses to change into ω1. Prior to the Radin forcing we perform a preparatory iteration to add functions from + into Radin names for what will become members of the jointly universal family on +. The same technique can be used with any uncountable cardinal in place of ω1. Secondly we explore various topics in set-theoretic geology. We begin by showing that a class Easton support iteration of Add(,1) at regular results in a universe that is its own generic mantle. We then consider set forcings P, Q, R and S with respective generics G, H, I and J such that V[G][I]=V[H][J] and show that V[G] and V[H] must have a shared ground via (|R|+|S|)+-cc forcing. This allows a similar analysis of the related situation when P is replaced by a class iteration and V[H] by a generic ground of V[G]. We conclude with a simple characterisation of the mantle of a class forcing extension, and an investigation of the possibilities for a version of the intermediate model theorem that applies to class forcing.