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I have a graph like this:

START root=node(0) 
(Dark { name:"dark" }),(Colors { name:"colors" }),(Blue { name:"blue" }),
(Indigo { name:"indigo" }),(Red { name:"red" }),(Orange { name:"orange" }),
(LightOrange { name:"lightorange" }),(Tangerine { name:"tangerine" }),

It's essentially a tree, with some connections in between the branches.

Hence given an input of "dark","tangerine" and "indigo", I can get the most recent common ancestor, like so:

START a=node(*), b=node(*),c=node(*) 
MATCH pa=a-[s:CHILD*]->x, pb=b-[s:CHILD*]->x,pc=c-[s:CHILD*]->x 
WHERE = 'dark' AND = 'tangerine' AND = 'indigo' 
ORDER BY length(pa+pb+pc) 

My question is, how do I get the nodes of the smallest set of tree branch(es), that can result in the ancestor? For example, the result for the above query can be "dark", "orange","red","colors","indigo".

share|improve this question
Not sure I understand. Wouldn't it be "dark", "colors", "red", and maybe "blue"? Why "indigo" and "orange"? Also, you might be interested in my earlier post: – Eve Freeman Sep 23 '13 at 5:03
Sorry I missed a relation there - there should also be a Indigo-[:CHILD]->Orange. The graph I'm looking for looks like this: . I've also checked out your page Wes, and I'm planning to use Anormcypher as well :) So thanks. – Bala Sep 23 '13 at 5:56

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