Luzin's (N) and randomness reflection

Abstract

We show that a computable function f: R→ R has Luzin's property (N) if and only if it reflects 11-randomnes, if and only if it reflects 11( O)-randomness, and if and only if it reflects O-Kurtz randomness, but reflecting Martin-L\"of randomness or weak-2-randomness does not suffice. Here a function f is said to reflect a randomness notion R if whenever f(x) is R-random, then x is R-random as well. If additionally f is known to have bounded variation, then we show f has Luzin's (N) if and only if it reflects weak-2-randomness, and if and only if it reflects '-Kurtz randomness. This links classical real analysis with algorithmic randomness.