Is there a classical analogue to purification of quantum states?

Just to add a couple more equations to the other answer, consider a (classical, discrete) joint probability distribution $(p_{ij})_{ij}$. Let the corresponding marginal distribution be $(q_i)_i$ with $q_i=sum_j p_{ij}$. Then $$S(q)=-sum_i q_i log q_i=-sum_{ij}p_{ij}logleft(sum_k p_{ik}right) le -sum_{ij}p_{ij}log p_{ij}=S(p).$$

On the other hand, in the quantum case, consider the maximally entangled two-qubit state $$newcommand{ket}[1]{lvert #1rangle}ketPsiequivfrac{1}{sqrt2}(ket{0,0}+ket{1,1}).$$ This, when measured in the computational basis, corresponds to the probability distribution $p_{ij}=frac12(delta_{i,0}delta_{j,0}+delta_{i,1}delta_{j,1})$, which has entropy $S(p)= log2 .$ However, and this is a crucial point, in the quantum case the entropy depends on the measurement basis, and if a state is pure we can always find a measurement basis with respect to which the entropy is zero.

The corresponding marginal state is totally mixed state: $operatorname{Tr}_B(ketPsilanglePsirvert)=I/2$. This is not a pure state anymore, and in any measurement basis it corresponds to the outcome probabilities $q_1=q_2 = 1/2$, and thus to the entropy $S(q)=log2$.

Therefore in the quantum case the marginal distribution can have larger entropy than the joint distribution, which as we showed above is not possible for classical distributions.