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It seems this must be a common scheduling problem, but I don't see the solution or even what to call the problem. It's like a topological sort, but different....

Given some dependencies, say

A -> B -> D -- that is, A must come before B, which must come before D
A -> C -> D

there might be multiple solutions to a topological sort:

    A, B, C, D
and A, C, B, D

are both solutions.

I need an algorithm that returns this:

(A) -> (B,C) -> (D)

That is, do A, then all of B and C, then you can do D. All the ambiguities or don't-cares are grouped.

I think algorithms such as those at Topological Sort with Grouping won't correctly handle cases like the following.

A -> B -> C -> D -> E
A - - - > M - - - > E

For this, the algorithm should return

(A) -> (B, C, D, M) -> (E)

This

A -> B -> D -> F
A -> C -> E -> F

should return

(A) -> (B, D, C, E) -> (F)

While this

A -> B -> D -> F
A -> C -> E -> F
     C -> D
     B -> E

should return

(A) -> (B, C) -> (D, E) -> (F)    

And this

A -> B -> D -> F
A -> C -> E -> F
A -> L -> M -> F
     C -> D
     C -> M
     B -> E
     B -> M
     L -> D
     L -> E

should return

(A) -> (B, C, L) -> (D, E, M) -> (F)    

Is there a name and a conventional solution to this problem? (And do the algorithms posted at Topological Sort with Grouping correctly handle this?)

Edit to answer requests for more examples:

A->B->C
A->C 

should return

(A) -> (B) -> (C). That would be a straight topological sort.

And

A->B->D
A->C->D
A->D

should return

(A) -> (B, C) -> (D)

And

A->B->C
A->C
A->D

should return

(A) -> (B,C,D)
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What is the expected answer for: A->B->C, A->C ? –  ElKamina Jan 12 '12 at 0:18
    
Sorry to pester you, but how about A->B->D, A->C->D, A->D ? –  ElKamina Jan 12 '12 at 0:37
    
Oh really! Last one! A->B->C, A->C, A->D –  ElKamina Jan 12 '12 at 0:44
    
(A) -> (B,C,D) is incorrect right? Because B->C ? –  ElKamina Jan 12 '12 at 1:02
    
Can there be input like this A->B->C->D->E, A->M->F? The answer seems to be A->(B,C,D,E,M,F)? –  dnls Jan 12 '12 at 1:30

1 Answer 1

up vote 6 down vote accepted

Let G be the transitive closure of the graph. Let G' be the undirected graph that results from removing the orientation from G and taking the complement. The connected components of the G' are the sets you are looking for.

share|improve this answer
    
OK, now I need to figure out what that means. Thanks for the lead! –  JPM Jan 12 '12 at 3:07
1  
Now I understand it. And now I need to figure out how to code it in XSLT. Thanks wye-bee! –  JPM Jan 12 '12 at 21:27

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