# Algorithm for sorting loosely comparable data?

Let's say I have an unsorted list of four objects: [B, C, A, D]. All four objects are of the same type, and:
(A > B),
(C > D),
(A != C or D)
(B != C or D)
(C != A or B)
(D != A or B).
By "!=", I mean that they are neither less-than, equal-to, or greater-than the other objects.

I need to "sort" the list such that A will always come before B, and C will always come before D. Beyond those two requirements, I have no demand on the ordering of the list; therefore, given the previously described list, the sort function should return either [A, B, C, D] or [C, D, A, B].

As for the cause of this problem, I am trying to sort an array of java.lang.Class objects based on their relationships to each other. For example, if A is the super-class/super-interface of B, then A is less-than B. If A extends/implements B, then is A greater-than B. If A is B, then obviously A equals B. Otherwise, A is completely non-comparable to B.

~Mack

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This is called "topological sort". You need to establish the "greater than" relationships, and from there you can compute a "rank" value for every element with a simple recursive function: the rank of an element is the rank of what it's greater than + 1, or else 1. Then you can sort normally on the rank. – Pointy Oct 2 '10 at 23:29
I think you need to explain why [A, C, B, D], [A, C, D, B], [C, A, D, B] and [C, A, B, D] aren't a valid solution. Or do you just want to keep comparable objects together. Then you should make something that will determine "an" order of that: Comparability of these should become before comparability of those. – ontrack Oct 2 '10 at 23:30
What's the question? Why can't you always output [A, B, C, D] if you know this to be correct? – IVlad Oct 2 '10 at 23:31
@ontrack Those alternate solutions would also work. I am simply trying to ensure that if [X] > [Y], then [X] will come before [Y], after sorting. – Mackenzie Oct 2 '10 at 23:34
@IVlad The given list is only an example. In reality, the input could have hundreds of elements; therefore, there is no single correct output from the sort function. – Mackenzie Oct 2 '10 at 23:36

Build a graph. For each two elements `x` and `y` such that `x > y`, add a directed edge from `x` to `y`. In your example you'd have `A -> B` and `C -> D`. Then run topological sort on this graph. The topological sort returned will be a possible solution.