I recently asked a question here, and got some very elegant answers. Here it is:
I have a similar problem, in which there can be multiple roots, which means there are separate trees. Here is an example (in perl);
my @rules = ( [ qw( A B C ) ], [ qw( B D E ) ], [ qw( C H G ) ], [ qw( G H ) ], [ qw( Z C ) ] );
In the list of lists
@rules, A is parent of B and C. Generally, the first element is the parent of rest of the elements in the list.
I would like to process this set of arrays, and generate a list which contains the correct order. Here, A and Z must come before the other elements (the order of A and Z is not important, since they are independent). Here are two example solutions:
(A,Z,B,C,D,E,F,G,H), or (Z,A,B,D,E,F,C,G,H)
Important: Look at array number 3; H comes before G, even though it's a child of G in the fourth array. So there is not particular order of children in each array, but in the final result (as shown over) must have any parent before it's child/ren.