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I have been looking for results or theorems which give me regularity conditions of the Radon-Nikodym derivative, but I have not found any :(

For instance, we know that if $\nu\ll\mu$ then there exists $f\in L^1$ s.t. $\nu = \int f d\mu$.

I wonder if, under extra conditions, we can say more about $f$, like $f\in \mathcal{C}$ or similar.

Are there results? Thank you very much for any help!

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    $f$ is not uniquely determined (for example, if $\mu$ is absolutely continuous it can have countably many arbitrary removable discontinuities), so I doubt you will be able to get a condition like $f \in \mathcal C$.2012-12-14
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    Yes, I know, that is precisely my question. If I can add more conditions maybe to $\mu$ or $\nu$ or anything else in order to get $f\mathcal{C}$.2012-12-15
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    I think Daniel refers to a continuous version of $f$. In other words a $g \in \mathcal{C}$ such that $g = f$ $\mu-$a.e.2018-07-02

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