# find a common subgraph

I am trying to find to get the common subgraph given two graphs. If I have 2 graphs G1=(v1,e1) and G2=(v2,e2) i must find the common subgraf G=(V,E) such as to any another common subgraph of G1 and G2 mustn't contain more then cardinal of E arris.

Given that Graph 1 is

A - B

A - C

B - D

D - E

Graph 2 is

A - B

A - E

B - D

Than the algorithm should return

A - B

B - D

Can you help me with an algorithm which tells me what steps to attend? Thanks!

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Correct me if I am wrong - but it seems you are looking for the largest common subset of edges. Is that correct? –  amit Dec 10 '12 at 18:01
Home work due in for tomorrow or can you leave it with us? –  webnoob Dec 10 '12 at 18:14

You are not describing your problem formally, but from your example1, it seems you are looking for a largest common subset of edges.

To achieve it - you simply need the intersection of E1 and E2.

Proof:

(->) Assume `(a,b)` is in `E1 [intersection] E2`. By definition of set intersection - it is common to both E1 and E2 - and thus to G1 and G2 as well.

(<-) Assume `(a,b)` is common to G1 and G2 - then `(a,b)` is in `E1` and `(a,b)` is in `E2` - from definition of intersection, `(a,b)` is in `E1 [intersection] E2`

(1) I conclude that because `(A,C)` is not "common", and yet `(A,B)` is in the subgraph - meaning this is not a restriction of finding a subset of vertices that can create the desired subgraph (because then `A` should have been excluded from the result).

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