On configurations concerning cardinal characteristics at regular cardinals

Abstract

We study the consistency and consistency strength of various configurations concerning the cardinal characteristics sθ,pθ,gθ,rθ,tθ at uncountable regular cardinals θ. Motivated by a theorem of Raghavan-Shelah who proved that sθ≤bθ, we explore in the first part of the paper the consistency of inequalities comparing sθ with pθ and gθ. In the second part of the paper we study variations of the extender-based Radin forcing to establish several consistency results concerning rθ from hyper-measurability assumptions, results which were previously known to be consistent only from supercompactness assumptions. In doing so, we answer several questions which appeared in the literature.