The subcompleteness of diagonal Prikry forcing
Abstract
Let D be an infinite discrete set of measurable cardinals. It is shown that generalized Prikry forcing to add a countable sequence to each cardinal in D is subcomplete. To do this it is shown that a simplified version of generalized Prikry forcing which adds a point below each cardinal in D, called generalized diagonal Prikry forcing, is subcomplete. Moreover, the generalized diagonal Prikry forcing associated to D is subcomplete above μ, where μ is any regular cardinal below the first limit point of D.
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