I'm trying to make a rule that will rewrite into a nested tree (similar to a binary tree).

For example:

```
a + b + c + d;
```

Would parse to a tree like `( ( (a + b) + c) + d)`

. Basically each root node would have three children (LHS '+' RHS) where LHS could be more nested nodes.

I attempted some things like:

```
rule: lhs '+' ID;
lhs: ID | rule;
```

and

```
rule
: rule '+' ID
| ID '+' ID;
```

(with some tree rewrites) but they all gave me an error about it being left-recursive. I'm not sure how to solve this without some type of recursion.

EDIT: My latest attempt recurses on the right side which gives the reverse of what I want:

```
rule:
```

ID (op='+' rule)?

-> {op == null}? ID

-> ^(BinaryExpression<node=MyBinaryExpression> ID $op rule)

Gives `(a + (b + (c + d) ) )`

`a + b`

are all child nodes, what is the root? Why don't you want the operator as root? – Bart Kiers Jun 27 '12 at 6:49