Ranked Forcing and the Length of Generalized Borel Hierarchies
Abstract
We extend A. Miller's framework of α-forcing to the case of a regular uncountable cardinal = < and apply it to study the structure of the -Borel hierarchy on subspaces of the generalized Baire space . We isolate a class of iterations of α-forcing and show that it satisfies a certain combinatorial property of admitting a sufficiently rich family of rank functions; this fact is then used to construct several models in which nontrivial constellations for the length of the -Borel hierarchy on multiple subspaces of are realized simultaneously. Finally, we provide a higher variant of Steel's forcing with tagged trees and generalize arguments of Stern to derive the exact -Borel complexity of certain classes of well-founded trees.
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