Clarification: In my original wording of this question, regrettably, I did not make it clear that I am interested in the the Boltzmann/Gibbs/statistical (BGS) interpretation of it, as opposed to the Carnot/Clausius/"classical" (CCC) interpretation. I know that these two interpretations are supposed to be equivalent, in principle. This equivalence is something I can only take on faith. Be that as it may, for the sake of this question, I would like to exclude the CCC interpretation altogether, and restrict the discussion to the BGS interpretation exclusively. In particular, when I write entropy, I mean Boltzmann's
$$S = k_B \ln W .$$
Textbook discussions of the Second Law of Thermodynamics (SLT) often stress that this law applies only to "closed systems". Or, differently stated: if the system is not closed, its entropy can go down.
The argument is further refined as follows. Suppose that $B$ is a closed system, and that $A$ and $A^{'}$ are "disjoint" subsystems of $B$ such that $B = A + A^{'}$. Then, by SLT,
$$\Delta S_B = \Delta S_A + \Delta S_{A^{'}} > 0\label{a}\tag{1}$$
...but this does not rule out cases where
$$\Delta S_A < 0\label{b}\tag{2}.$$
In such case $\Delta S_{A^{'}}$ would be positive and such that $|\Delta S_{A^{'}}| > |\Delta S_A|$ thereby preserving the inequality in $(\ref{a})$.
My question is: How is this particular aspect of the theory verified experimentally?
IOW, is it possible to set up an actual (as opposed to "Gedanken-") experiment where all three quantities in $(\ref{a})$ are measured, and such that, with the measured values, both $(\ref{a})$ and $(\ref{b})$ hold?
Or is the argument given above simply a purely theoretical (i.e. experimentally unverifiable) construct to explain why apparent reductions in entropy1 are not necessarily violations of SLT?
1 ...such as in the formation of ordered crystals from a disordered collection of molecules in solution.
