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I have the following DAG

A --> B

|     |
v     v

C --> D

Here is the closure table

| Ancestor | Descendant | Depth |
---------------------------------
| A        | A          | 0     |
| A        | B          | 1     |
| A        | C          | 1     |
| A        | D          | 2     |
| A        | D          | 2     |
| B        | B          | 0     |
| B        | D          | 1     |
| C        | C          | 0     |
| C        | D          | 1     |
| D        | D          | 0     |

How would I go about removing path B > D (thus removing A > B > D) without also removing A > C > D and C > D.

Right now I'm using the following query but it only works when every node only has 1 parent.

DELETE FROM `Closure`
WHERE `Descendant` IN (SELECT `Descendant` FROM `Closure` WHERE `Ancestor`=@Node)
AND `Ancestor` NOT IN (SELECT `Descendant` FROM `Closure` WHERE `Ancestor`=@Node);
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2 Answers 2

First, I believe there is a duplicate entry in your table. (A,D) appears twice. Second, after removing the edge (B,D), the following paths should remain:

  1. Node self-maps: (A,A), (B,B), (C,C), (D,D)
  2. (A,B)
  3. (A,C)
  4. (A,D) ( through C )

Thus, to remove the edge (B,D) in this example, all that is required is to remove that one row:

Delete MyTable 
Where Ancestor = 'B'
    And Descendant = 'D'

A closure table is still only mapping relations between two nodes. What makes it special is that it is mapping every indirect relation effectively as a direct relation. The edge (B,D) is simply saying that you can get from B to D. That row alone says nothing about how you got to B nor does it say anything about how many nodes it took to get from B to D; it simply saying you can get from B to D. Thus, there is no edge listed for A > B > D per se. Rather, all that is captured is that you can get from A to B and from A to D which is still true even if the edge (B,D) is removed.

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The duplicate (A,D) is actually the root of this question - it exists to show that in a closure table you would have one (A,D) caused by ABD and one from ACD. How do I detect when another path intersects in this diamond and not delete (A,D)? Preferably only using SQL and only given the edge (B,D). –  NtscCobalt May 29 '13 at 20:56
    
@NtscCobalt - It make no sense to have (A,D) in there twice. A closure table doesn't describe how one node connects with another; only that one node connects with another. Thus, if (A,D) is in the table, it doesn't matter if the path to get from A to D was A > B > C > E >.....> X > Y > D or A > D. That's the point. The closure table saves you the trouble of having to calculate that path each time. If you are trying to capture the paths used to get from one node to another, then a closure table isn't the solution. Instead store the graph in an edges table and calculate the path. –  Thomas May 29 '13 at 21:32
    
ah, yeah I'm having a hard time remember why I asked this question to be honest. I can't really remember what we decided to do as a solution. I think the original intention was to figure out a way to remove the edge from (B,D) and remove any entries in the closure table caused by it without accidentally removing edges that still exist. The only solution I can immediately think of is to rebuild the entire closure table from nodes you know are only 1 step away. –  NtscCobalt May 29 '13 at 21:35
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In natural language, that would be: "Delete ancestor-descendant relashionship to D, if there is no parent of D besides B that is also a descendant of A". Is that correct?

(Edit: no, that's not correct; not only relashionships to D must be removed, but also relashionships to every descendant of D. Thus, that criteria is not valid...)

My tentative SQL would then be:

DELETE a
FROM Closure AS a
    INNER JOIN Closure AS b ON a.Descendant = b.Descendant
WHERE
    a.Descendant IN (SELECT Descendant FROM Closure WHERE Ancestor = {Child}) AND
    b.Depth = 1 AND
    b.Ancestor != {Parent} AND
    a.Ancestor NOT IN (SELECT Ancestor FROM Closure WHERE Descendant = b.Ancestor)

(Sorry if I got the query wrong - or used non-standard features - I'm not actually experienced with that. But my natural language description should give an insight for what actually needs to go on the query)


Update: On second thought, I don't believe my query will work for all cases. Consider this:

A --> B --> D --> E --> F
  1. F is a descendant of D (True)
  2. E is a parent of F (True)
  3. E is not B (True)
  4. A is not an ancestor of E (False)

Thus, A >> F won't be removed, even though it should. Sorry I couldn't help, but that seems a problem too big to fit in a single query. I'd suggest looking for an algorithmic solution first, then seeing how that could be implemented in your case.

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