Forcing More DC Over the Chang Model Using the Thorn Sequence

Abstract

In the context of ZF+DC, we force DC for relations on P() for <ω over the Chang model L(Ordω) making some assumptions on the thorn sequence defined by xFE0=ω, xFEα+1 as the least ordinal not a surjective image of xFEαω (i.e. no f: xFEαω→ xFEα+1 is surjective) and xFEγ=α<γ xFEα for limit γ. These assumptions are motivated from results about in the context of determinacy, and could be reasonable ways of thinking about the Chang model. Explicitly, we assume cardinals λ on the thorn sequence are strongly regular (meaning regular and functions f:<→ λ are bounded whenever <λ is on the thorn sequence) and justified (meaning P(ω) L(Ordω)⊂eq Lλ(λω,X) for some X⊂eq λ for any <λ on the thorn sequence). This allow us to use Cohen forcing and establish more dependent choice.