Some more results on relativized Chaitin's
Abstract
We prove that, assuming ZF, and restricted to any pointed set, Chaitin's U:x Ux=ΣUx(σ)2-|σ| is not injective for any universal prefix-free Turing machine U, and that Ux fails to be degree invariant in a very strong sense, answering several recent questions in descriptive set theory. Moreover, we show that under ZF+AD, every function f mapping x to x-random must be uncountable-to-one over an upper cone of Turing degrees.
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