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I'm trying to write a function that returns a memoized recursive function in Clojure, but I'm having trouble making the recursive function see its own memoized bindings. Is this because there is no var created? Also, why can't I use memoize on the local binding created with let?

This slightly unusual Fibonacci sequence maker that starts at a particular number is an example of what I wish I could do:

(defn make-fibo [y]
  (memoize (fn fib [x] (if (< x 2)
             y
             (+ (fib (- x 1))
                (fib (- x 2)))))))

(let [f (make-fibo 1)]
  (f 35)) ;; SLOW, not actually memoized

Using with-local-vars seems like the right approach, but it doesn't work for me either. I guess I can't close over vars?

(defn make-fibo [y]
  (with-local-vars [fib (fn [x] (if (< x 2)
                                  y
                                  (+ (@fib (- x 1))
                                     (@fib (- x 2)))))]
    (memoize fib)))

(let [f (make-fibo 1)]
  (f 35)) ;; Var null/null is unbound!?! 

I could of course manually write a macro that creates a closed-over atom and manage the memoization myself, but I was hoping to do this without such hackery.

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6 Answers 6

up vote 14 down vote accepted

This seems to work:

(defn make-fibo [y]
  (with-local-vars
      [fib (memoize
            (fn [x]
              (if (< x 2)
                y
                (+ (fib (- x 2)) (fib (dec x))))))]
    (.bindRoot fib @fib)
    @fib))

with-local-vars only provides thread-local bindings for the newly created Vars, which are popped once execution leaves the with-local-vars form; hence the need for .bindRoot.

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Ding ding ding, thank you, we have a winner! But why did we have to jump into javaland to do the bindRoot? More importantly, doesn't this create a concurrency hazard if two threads do a .bindRoot at nearly the same time, before the vars are closed over when they exit the scope of this function? Is this still safe for concurrent creations of the generated Fibonacci functions? Or is the .bindRoot lexically scoped somehow? I'm still a little confused... –  ivar Oct 11 '10 at 17:14
    
.bindRoot is synchronized, however this doesn't even matter here, since we call it on a local Var which is not accessible from any other thread at this point. As for the Javaish feel of a method call, I believe it is unavoidable here (alter-var-root won't work, since it requires some root binding to be already in place), but I don't see this as a problem. If anything, I wonder if I'd maybe prefer doing the same thing in some way not involving local Vars, but on the other hand, this does seem to be a particularly simple approach... –  Michał Marczyk Oct 11 '10 at 18:55
    
Thanks, I think I get it now. The bindRoot call creates a root binding of the var, however this binding is not shared with other threads because they have their own thread-local bindings of the var, and therefore the dynamic scoping of the vars doesn't bite us in the ass. Also, the bindRoot doesn't imply that the var will be visible from the toplevel. –  ivar Oct 12 '10 at 8:51
1  
The root binding is accessible from other threads through the machinery behind memoize -- the latter is, however, thread-safe. (But see this blog post by Meikel Brandmeyer for an in-depth analysis of memoization in Clojure and associated gotchas.) The Var is not, however, directly visible from anywhere except the body of the with-local-vars form (it's a Var local to that body) and so cannot be got at in any way after make-fibo returns except through calls to the returned function. –  Michał Marczyk Oct 12 '10 at 20:33
2  
For future readers... I extracted this into a macro: gist.github.com/1136161 –  Ben Mabey Aug 10 '11 at 4:57
(def fib (memoize (fn [x] (if (< x 2)
                              x
                              (+ (fib (- x 1))
                                 (fib (- x 2)))))))
(time (fib 35))
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That is more typical style if you want the var bound in your namespace, but unfortunately you have incorrectly changed the function! What happened to the y parameter?! –  ivar Oct 11 '10 at 17:17
    
(fib 2000) gives a StackOverflowError. The example above does not use recur, so stack overflows are inevitable, unless you "warm up" the memoization by calling the function for 1 to 2000. But how do you know that 2000 is big enough for an arbitrary use case? That's the rub! –  David James Dec 3 '13 at 16:32

There is an interesting way to do it that does rely neither on rebinding nor the behavior of def. The main trick is to go around the limitations of recursion by passing a function as an argument to itself:

(defn make-fibo [y]
  (let
    [fib
      (fn [mem-fib x]
         (let [fib (fn [a] (mem-fib mem-fib a))]
           (if (<= x 1)
             y
             (+ (fib (- x 1)) (fib (- x 2))))))
     mem-fib (memoize fib)]

     (partial mem-fib mem-fib)))

Then:

> ((make-fibo 1) 50)
20365011074

What happens here:

  • The fib recursive function got a new argument mem-fib. This will be the memoized version of fib itself, once it gets defined.
  • The fib body is wrapped in a let form that redefines calls to fib so that they pass the mem-fib down to next levels of recursion.
  • mem-fib is defined as memoized fib
  • ... and will be passed by partial as the first argument to itself to start the above mechanism.

This trick is similar to the one used by the Y combinator to calculate function's fix point in absence of a built-in recursion mechanism.

Given that def "sees" the symbol being defined, there is little practical reason to go this way, except maybe for creating anonymous in-place recursive memoized functions.

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You can encapsulate the recursive memoized function pattern in a macro if you plan to use it several times.

(defmacro defmemo
  [name & fdecl]
  `(def ~name
     (memoize (fn ~fdecl))))
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Your first version actually works, but you're not getting all the benefits of memoization because you're only running through the algorithm once.

Try this:

user>  (time (let [f (make-fibo 1)]
          (f 35)))
"Elapsed time: 1317.64842 msecs"
14930352

user>  (time (let [f (make-fibo 1)]
          [(f 35) (f 35)]))
"Elapsed time: 1345.585041 msecs"
[14930352 14930352]
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It doesn't work recursively, though, and that far more important than just caching the single end value. –  ivar Oct 11 '10 at 16:52

Here is the simplest solution:

(def fibo
  (memoize (fn [n]
             (if (< n 2)
               n
               (+ (fibo (dec n))
                  (fibo (dec (dec n))))))))
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