Kloks, Kratsch, and Spinrad showed how treewidth and minimum-fill, NP-hard
combinatorial optimization problems related to minimal triangulations, are
broken into subproblems by block subgraphs defined by minimal separators. These
ideas were expanded on by Bouchitt\'e and Todinca, who used potential maximal
cliques to solve these problems using a dynamic programming approach in time
polynomial in the number of minimal separators of a graph. It is known that
solutions to the perfect phylogeny problem, maximum compatibility problem, and
unique perfect phylogeny problem are characterized by minimal triangulations of
the partition intersection graph. In this paper, we show that techniques
similar to those proposed by Bouchitt\'e and Todinca can be used to solve the
perfect phylogeny problem with missing data, the two- state maximum
compatibility problem with missing data, and the unique perfect phylogeny
problem with missing data in time polynomial in the number of minimal
separators of the partition intersection graph