# Detecting unusual path patterns in a gigantic directed graph

I have a gigantic directed graph (100M+ nodes) of nodes, with multiple path instance records between sets of nodes. the path taken between any two nodes may vary, but what I'd like to find are paths that share multiple intermediary nodes except for a major deviation.

For example, I have 10 instances of a path between node A and node H. Nine of those ten path instances travel through nodes c,d,e,f - but one of the instances travels through c,d,z,e,f - I want to find that "odd" instance.

Any ideas how I would even begin to approach such a problem? Existing analytical frameworks that might be suited to the task?

• A PIR (path instance record) is a list of nodes traveled through with associated edge traversal times per edge.
• Currently, raw PIR records are in a plain string format - obviously, I would want to store it differently based on how I eventually choose to analyze it.
• This is not a route solving problem - I never need to find all possible paths; I only need to analyze taken paths (each of which is a PIR).
• The list of subpaths needs to be generated from the PIRs.

An example of a PIR would be something like: nodeA;300;nodeB;600;nodeC;100;nodeD;100;nodeF

This translates to the path of A->B-C->D->F; the cost/time of each vertice is the number - for instance, it cost 300 to go from A->B, 600 to go from B->C, and 100 to go from D->F. The cost/time of each traversal will differ each time the traversal is made. So, for instance, in one PIR, it may cost 100 to go from A->B, but in the next it may cost 150 to go from A->B.

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[Longest Common Subsequence][1] should give you the common nodes between two paths. Not sure about how to mine them in an intelligent way after that. [1]: en.wikipedia.org/wiki/Longest_common_subsequence_problem –  BiGYaN May 10 at 10:05
I've posted an answer below that should work for most cases, but "odd" isn't very well defined. However, it sounds like the main thing is that you are looking for cases where a sequence is sufficiently common, and there are one or more paths that have have a subsequence that is a small edit distance away from it. The task then is just to define exactly how common, and how small the edit distance, as well as which edit distance metric to use. –  Nuclearman May 10 at 12:20
Please edit question with answers to following: Are nodes-of-interest (eg, A and H) given for each problem instance, or does the algorithm need to seek out all pairs of nodes that have deviate paths? Solve it once only? Letting PIR=“path instance record”, is a PIR just a list of nodes? Are PIRs stored in random order in a sequentially-accessed file, or in a DB, or what? Given a pair of node names X,Y, how do you get the list of all paths between X and Y? How do you get a list of all paths that go through node C, or of all paths that go through one or more of C,D...Z, or through all of C,D...Z? –  jwpat7 May 10 at 14:30
What do you mean by "...with associated edge traversal times per edge."? Could you give an example or two of this (with the PIR). –  Nuclearman May 11 at 21:07
Hmmm, seems like the cost doesn't actually have an affect on what you looking for, unless definition for "major deviation" is based on the cost, in which case, my suggestion for edit distance may be insufficient. Otherwise, seems edit distance holds as valid. Also how many paths do you have? –  Nuclearman May 13 at 8:43