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I'm just wondering if, like for strings where we have the Levenshtein distance (or edit distance) between two strings, is there something similar for graphs?

I mean, a scalar measure that identifies the number of atomic operations (node and edges insertion/deletion) to transform a graph G1 to a graph G2.

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5 Answers 5

I think graph edit distance is the measure that you were looking for.

Graph edit distance measures the minimum number of graph edit operations to transform one graph to another, and the allowed graph edit operations includes:

  • Insert/delete an isolated vertex
  • Insert/delete an edge
  • Change the label of a vertex/edge (if labeled graphs)

However, computing the graph edit distance between two graphs is NP-hard. The most efficient algorithm for computing this is an A*-based algorithm, and there are other sub-optimal algorithms.

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The best answer, IMO. –  Aman Jul 10 '13 at 18:43
    
references please –  ivotron Oct 25 at 4:50

You should look at the paper A survey of graph edit distance

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Note:

The Levenshtein distance (or edit distance) is between two strings

But in Graph you should search between at least N! position that you find Identity of each edge and vertex. You can compare between two graph by unique index easily,But The master question is define identity for each vertex and edge.this question (find identity for each vertex and edge in two graph that they can to transform ) is very hard and was called isomorphism problem (NP-Complete). You can search about isomorphism graph.

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For a general graph it is a NP-complete problem as others mentioned in their answer. But for tree graph there are well known polynomial algorithms. May be most famous of them is "Zhang Shasha" algorithm which was published in 1989.

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This may be the subgraph isomorphism problem (which is NP-Complete): find a subgraph of G2 that is isomorphic to G1, then subtract the subgraph from G2 - the result would be the "edit distance" between G1 and G2.

It seems unlikely that there would be a polynomial time algorithm to solve this - at some point you've got to determine if the graphs or their subgraphs are isomorphic. However, if you've got a special graph then you might be able to solve the problem in polynomial time; for example, if you've got two directed acyclic graphs with a well defined topological sort.

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