On Indestructible Strongly Guessing Models

Abstract

In MV we defined and proved the consistency of the principle GM+(ω3,ω1) which implies that many consequences of strong forcing axioms hold simultaneously at ω2 and ω3. In this paper we formulate a strengthening of GM+(ω3,ω1) that we call SGM+(ω3,ω1). We also prove, modulo the consistency of two supercompact cardinals, that SGM+(ω3,ω1) is consistent with ZFC. In addition to all the consequences of GM+(ω3,ω1), the principle SGM+(ω3,ω1), together with some mild cardinal arithmetic assumptions that hold in our model, implies that any forcing that adds a new subset of ω2 either adds a real or collapses some cardinal. This gives a partial answer to a question of Abraham AvrahamPhD and extends a previous result of Todorcevi\'c Todorcevic82 in this direction.