From Internal to External: Classical Models of ZF + PP +

Abstract

Goal. We analyze when the Partition Principle (PP) holds without AC in models arising from a free finite H-action on Cantor space, and reconcile two standard routes to such models. Approach. Route I proceeds via a Boolean-valued presentation Sh(B) and symmetric names; Route II uses direct forcing with Fn(N× H,2) and finite-support automorphisms. We prove a unification theorem identifying the resulting symmetric submodels and develop a Local-to-Global Embedding Principle (LEP) for hereditarily symmetric names. Results. We prove external PP in the symmetric model N built via Route II. From LEP we obtain that PP holds in the symmetric model, hence N ZF+PP+AC. Along the way, we unify the Route I/Route II presentations functorially. Limitations. Our proof exploits the countable-support stratification of Fn(N× H,2); extending the LEP/gluing to uncountable presentations (e.g. Fn(× H,2) for >ω) or, more generally, to -directed families of finite supports remains open.

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