I am  looking for the following statemente. 
Let $X$ be a topological space and let $\mu$, $\nu$ be radon borel measures in the same measure class i.e. the the zero-sets are identical. Denote then by $f$ the radon derivative.

We can assumme a lot of regularity on $X$ i.e. it is compact, locally compact...
Also we can assumme some regularity on $\mu$, $\nu$ i.e. atom-freeness the support is X...

It then the following statement true. 

For each $x$ in $X$ outside a measure zero- set and for each sequence of nested open sets $U_i$ whose intersection is only $x$ it follows that 
$f(x)=\liminf \mu(U_i)/\nu(U_i)   

Are there any further assumption for $U_i$?

Thanks