In case folks find this question and need something implemented for Node.js or the browser, I'm providing a link and code example for an implementation I've written that you can find on github here: (https://github.com/hoonto/jqgram.git) based on the existing PyGram Python code (https://github.com/Sycondaman/PyGram).

This is a tree edit distance *approximation* algorithm, but it is much, much faster than trying to find the true edit distance. The approximation performs in O(n log n) time and O(n) space whereas true edit distance is often O(n^3) or O(n^2) using known algorithms for true edit distance. See the academic paper from which the PQ-Gram algorithm comes: (http://www.vldb2005.org/program/paper/wed/p301-augsten.pdf)

So using jqgram:

Example:

```
var jq = require("jqgram").jqgram;
var root1 = {
"thelabel": "a",
"thekids": [
{ "thelabel": "b",
"thekids": [
{ "thelabel": "c" },
{ "thelabel": "d" }
]},
{ "thelabel": "e" },
{ "thelabel": "f" }
]
}
var root2 = {
"name": "a",
"kiddos": [
{ "name": "b",
"kiddos": [
{ "name": "c" },
{ "name": "d" },
{ "name": "y" }
]},
{ "name": "e" },
{ "name": "x" }
]
}
jq.distance({
root: root1,
lfn: function(node){ return node.thelabel; },
cfn: function(node){ return node.thekids; }
},{
root: root2,
lfn: function(node){ return node.name; },
cfn: function(node){ return node.kiddos; }
},{ p:2, q:3 },
function(result) {
console.log(result.distance);
});
```

And that gives you a number between 0 and 1. The closer to zero, the more closely related the two trees look to jqgram. One approach could be to use jqgram to narrow in on several closely related trees from among many trees given its speed, then utilize true edit distance on the few trees remaining that you need to take a closer inspection of, and for that you can find python implementations for reference or port of the Zhang & Shasha algorithm for example.

Note that the lfn and cfn parameters specify how each tree should determine the node label names and the children array for each tree root independently so that you can do funky things like comparing an object to a browser DOM for example. All you need to do is provide those functions along with each root and jqgram will do the rest, calling your lfn and cfn provided functions to build out the trees. So in that sense it is (in my opinion anyway) much easier to use than PyGram. Plus, its Javascript, so use it client or server-side!

ALSO, to answer with respect to cycle detection, check out the clone method inside of jqgram, there is cycle detection there, but credit for that goes to the author of node-clone from which that piece was slightly modified and included.

`MOVE(A,B)`

seem to be the same as`INSERT(A,B)`

if`A`

does not have any children. What happens to the children of`A`

if one does`INSERT(A,B)`

? (will they be attached to`A`

's parent ?) – Andre Holzner May 5 '11 at 10:21