this isn't a complete answer, but i think it's an alternative to the library Óscar López is asking for. unfortunately it's in clojure, but hopefully it's clear enough...

```
(def default-priorities
{'+ 1, '- 1, '* 2, '/ 2, '& 3})
(defn- extend-tree [tree priorities operator value]
(if (seq? tree)
(let [[op left right] tree
[old new] (map priorities [op operator])]
(if (> new old)
(list op left (extend-tree right priorities operator value))
(list operator tree value)))
(list operator tree value)))
(defn priority-tree
([operators values] (priority-tree operators values default-priorities))
([operators values priorities] (priority-tree operators values priorities nil))
([operators values priorities tree]
(if-let [operators (seq operators)]
(if tree
(recur
(rest operators) (rest values) priorities
(extend-tree tree priorities (first operators) (first values)))
(let [[v1 v2 & values] values]
(recur (rest operators) values priorities (list (first operators) v1 v2))))
tree)))
; [] [+ & *] [1 2 3 4] 1+23*4
; [+ 1 2] [& *] [3 4] - initial tree
; [+ 1 [& 2 3]] [*] [4] - binds more strongly than + so replace right-most node
; [+ 1 [* [& 2 3] 4]] [] [] - descend until do not bind more tightly, and extend
(println (priority-tree ['+ '& '*] [1 2 3 4])) ; 1+23*4
(println (priority-tree ['& '- '* '+ '&] [1 2 3 4 5 6])) ; 12 - 3*4 + 56
```

the output is:

```
(+ 1 (* (& 2 3) 4))
(+ (- (& 1 2) (* 3 4)) (& 5 6))
```

[**update**] adding the following

```
(defn & [a b] (+ b (* 10 a)))
(defn all-combinations [tokens length]
(if (> length 0)
(for [token tokens
smaller (all-combinations tokens (dec length))]
(cons token smaller))
[[]]))
(defn all-expressions [operators digits]
(map #(priority-tree % digits)
(all-combinations operators (dec (count digits)))))
(defn all-solutions [target operators digits]
(doseq [expression
(filter #(= (eval %) target)
(all-expressions operators digits))]
(println expression)))
(all-solutions 2012 ['+ '- '* '/ '&] (range 10 0 -1))
```

solves the problem, but it's slow - 28 minutes to complete. this is on a nice, fairly recent laptop (i7-2640M).

```
(+ (- (+ 10 (* 9 (& 8 7))) (& 6 5)) (* 4 (& (& 3 2) 1)))
(+ (- (+ (+ (* (* 10 9) 8) 7) 6) 5) (* 4 (& (& 3 2) 1)))
(- (- (+ (- (& 10 9) (* 8 7)) (* (& (& 6 5) 4) 3)) 2) 1)
```

(i only printed 2012 - see code above - but it would have evaluated the entire sequence).

so, unfortunately, this doesn't really answer the question, since it's no faster than Óscar López's code. i guess the next step would be to put some smarts into the evaluation and so save some time. but what?

[**update 2**] after reading the other posts here i replaced `eval`

with

```
(defn my-eval [expr]
(if (seq? expr)
(let [[op left right] expr]
(case op
+ (+ (my-eval left) (my-eval right))
- (- (my-eval left) (my-eval right))
* (* (my-eval left) (my-eval right))
/ (/ (my-eval left) (my-eval right))
& (& (my-eval left) (my-eval right))))
expr))
```

and the running time drops to 45 secs. still not great, but it's a very inefficient parse/evaluation.

[**update 3**] for completeness, the following is an implementation of the shunting-yard algorithm (a simple one that is always left-associative) and the associated eval, butit only reduces the time to 35s.

```
(defn shunting-yard
([operators values] (shunting-yard operators values default-priorities))
([operators values priorities]
(let [[value & values] values]
(shunting-yard operators values priorities nil (list value))))
([operators values priorities stack-ops stack-vals]
; (println operators values stack-ops stack-vals)
(if-let [[new & short-operators] operators]
(let [[value & short-values] values]
(if-let [[old & short-stack-ops] stack-ops]
(if (> (priorities new) (priorities old))
(recur short-operators short-values priorities (cons new stack-ops) (cons value stack-vals))
(recur operators values priorities short-stack-ops (cons old stack-vals)))
(recur short-operators short-values priorities (list new) (cons value stack-vals))))
(concat (reverse stack-vals) stack-ops))))
(defn stack-eval
([stack] (stack-eval (rest stack) (list (first stack))))
([stack values]
(if-let [[op & stack] stack]
(let [[right left & tail] values]
(case op
+ (recur stack (cons (+ left right) tail))
- (recur stack (cons (- left right) tail))
* (recur stack (cons (* left right) tail))
/ (recur stack (cons (/ left right) tail))
& (recur stack (cons (& left right) tail))
(recur stack (cons op values))))
(first values))))
```