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I'm trying to write a MySQL PROCEDURE which takes an edge e and an edge set eset as inputs and outputs a boolean value iscyclic to determine whether the additional edge results in a cyclic graph. Would there be any more straightforward way to do this other than creating a table of all the vertices with a column for something like "visit count" and then checking if any vertex is visited more than once while running through the edge set?

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First reaction: why would you want to use SQL to do something like that? Is there any chance that you can do this in another part of your system? – Billiska Nov 23 '12 at 21:19
If given that a graph is connected then the following statement holds: The graph is acyclic (is a tree) if and only if the number of nodes - 1 = number of edges. – Billiska Nov 23 '12 at 22:38
Is your eset guaranteed to be a tree? If so, you simply need to check that edge e has 1 end connected to eset and another end not connected to eset to make sure that e union eset is also a tree. – Billiska Nov 23 '12 at 22:42
Perhaps, if you could keep track of connected group of nodes while MST is being constructed, you'll be able to (more easily) answer whether a given eset is connected or not. – Billiska Nov 23 '12 at 22:55
In fact, the standard way to do Kruskal need that datastructure to keep track of connected groups. see the word "disjoint-set data structure" on en.wikipedia.org/wiki/Kruskal's_algorithm – Billiska Nov 23 '12 at 23:01
up vote 3 down vote accepted

As the comments of Billiska indicate, you need to keep track of the individual trees of your forest, i.e. the connected sets.

The easiest implementation of a disjoint set data structure would consist of a single temporary table, which maps the ID of every vertex to the ID of a parent. You can follow these parent links from one vertex to the next until you end up with the root of this tree, which is a vertex pointing at itself. This root serves as a unique representative that identifies the whole connected set.

So to check whether two sets are already connected, you compute their roots and simply compare them.

  • Initially every vertex is its own parent.
  • Connecting two nodes is modeled by computing their roots and making one of them the parent of the other.

There are additional tools to keep the depth of the tree low:

  • you'd always make the deeper tree the parent of the less deep one, and you could perform path compression to reduce the depth of found nodes.

All of this can be modeled in MySQL as well, but the performance behaviour might be different from an in-memory implementation.

So I'd suggest postponing that until you actually know that you need more performance, and have some data to test and compare different implementations.

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