Abstract
Grigorieff showed that forcing to add a subset of ω using partial functions with suitably chosen domains can add a generic real of minimal degree. We show that forcing with partial functions to add a subset of an uncountable κ without adding a real never adds a generic of minimal degree. This is in contrast to forcing using branching conditions, as shown by Brown and Groszek.
Citation
Brooke M. Andersen. Marcia J. Groszek. "Grigorieff Forcing on Uncountable Cardinals Does Not Add a Generic of Minimal Degree." Notre Dame J. Formal Logic 50 (2) 195 - 200, 2009. https://doi.org/10.1215/00294527-2009-006
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