Mouse scales
Abstract
We give a construction of scales (in the descriptive set theoretic sense) directly from mouse existence hypotheses, without using any determinacy arguments. The construction is related to the Martin-Solovay construction for scales on 12 sets. The prewellorders of the scales compare reals x and y by comparing features of certain kinds of fully backgrounded L[E,x]- and L[E,y]-constructions executed in mice P with x,y ∈ P. In this way we produce an inner model theoretic proof of the scale property for many pointclasses, for which the scale property was classically established using determinacy arguments (for example, 13). Moreover, it also yields many further pointclasses with the scale property, for example intermediate between 12n+1 and 12n+2, and also instances of complexity well beyond projective.
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