I would like to know the answers to the following two questions.

Let $S$ be a locally compact Hausdorff space, $\mu$ be a regular Borel measure with non-compact support $M$. Denote
$$
\mathscr{H}=\{\mathcal{H}\subset 2^M: \mathcal{H}\mbox{ is a disjoint family of Borel sets of positive measure}\}
$$
Note that for measures with the continuous part or infinitely many atoms there is an *infinite* family $\mathcal{H}\in\mathscr{H}$. 

**Question #1**. Does there exist an infinite family $\mathcal{H}\in\mathscr{H}$ such that for any compact $K\subset M$ only finitely many elements of $\mathcal{H}$ have positive measure intersection with $K$?

A few side notes:

 - I know, how to prove this in the case where $S$ is $\sigma$-compact;
 - There is an obvious example without $\sigma$-compactness - counting measure on an uncountable set;
 - From [342B, Measure theory. Vol 3. Measure algebras. D. H. Fremlin] I know how to construct at most countable disjoint family $\mathcal{H}$ consisting of compacts of positive measure.

Maybe it would be easier to characterize measures with the opposite property.

**Question #2**. What can we say about $S$ or $\mu$ if for any countable $\mathcal{H}\in \mathscr{H}$ there exists a compact $K$ such that infinitely many elements of $\mathcal{H}$ have positive measure intersection with $K$.  

It looks like these questions fit well into the realm of [measure algebras][1] but I don't know much about them. 


  [1]: https://www.encyclopediaofmath.org/index.php/Measure_algebra_(measure_theory)