Analytic computable structure theory and Lp spaces
Abstract
We continue the investigation of analytic spaces from the perspective of computable structure theory. We show that if p ≥ 1 is a computable real, and if is a nonzero, non-atomic, and separable measure space, then every computable presentation of Lp() is computably linearly isometric to the standard computable presentation of Lp[0,1]; in particular, Lp[0,1] is computably categorical. We also show that there is a measure space that does not have a computable presentation even though Lp() does for every computable real p ≥ 1.
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