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Probably best illustrated with a small example.
Given the relations

A < B < C
A < P < Q

Correct outputs would be

ABCPQ or APQBC or APBCQ ... etc.

In other words, any ordering is valid in which the given relationships hold.

I am most interested in the solution that is easiest to implement, but the best O(n) in speed and time is interesting as well.

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Are you asking for a way to merge two sorted lists? –  Triptych Jan 26 '09 at 17:39
    
No, a single initially randomly ordered list –  mike g Jan 26 '09 at 17:40
    
I still do not get the question, sorry. What do you mean by "randomly ordered"? And if the result should be sorted, why do you have several possible results (which are, for me, not really sorted at all)? Is another longer example possible? –  Kosi2801 Jan 26 '09 at 17:46
2  
@Kosi2801: A < B < C and A < P < Q are relationships, not lists. They specify that A must always come before B and B before C, but the relationship between B and P is not specified and therefore doesn't matter in the ordering. –  Michael Myers Jan 26 '09 at 17:53
    
thx too, got it now :) –  Kosi2801 Jan 27 '09 at 0:01

3 Answers 3

up vote 8 down vote accepted

This is called topological sorting.

The standard algorithm is to output a minimal element, then remove it and repeat until done.

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Do several sorts. First sort according to the first rule, then according to the second one and so on. Should work, unless your rules contain contradictions. sure easy enough to implement.

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its just an example - there isn't just 2 rules in general –  mike g Jan 26 '09 at 18:04
    
I am not sure that the number of rules are an issue. The result will still be correct. a little performance issue maybe. –  user54579 Jan 26 '09 at 18:06
    
and it's important to be a stable sort –  Georg Schölly Jan 26 '09 at 18:34

You could repeatedly call make_heap, pop_heap in C++ with the sequence at hand.

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