Any pointers on how to solve efficiently the following function in Haskell, for large numbers `(n > 108)`

``````f(n) = max(n, f(n/2) + f(n/3) + f(n/4))
``````

I've seen examples of memoization in Haskell to solve fibonacci numbers, which involved computing (lazily) all the fibonacci numbers up to the required n. But in this case, for a given n, we only need to compute very few intermediate results.

Thanks

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Is this homework? –  Aryabhatta Jul 8 '10 at 21:54
Only in the sense that it is some work that I'm doing at home :-) –  Angel de Vicente Jul 8 '10 at 21:58

We can do this very efficiently by making a structure that we can index in sub-linear time.

But first,

``````{-# LANGUAGE BangPatterns #-}

import Data.Function (fix)
``````

Let's define f, but make it use 'open recursion' rather than call itself directly.

``````f :: (Int -> Int) -> Int -> Int
f mf 0 = 0
f mf n = max n \$ mf (div n 2) +
mf (div n 3) +
mf (div n 4)
``````

You can get an unmemoized f by using `fix f`

This will let you test that f does what you mean for small values of f by calling, for example: `fix f 123 = 144`

We could memoize this by defining:

``````f_list :: [Int]
f_list = map (f faster_f) [0..]

faster_f :: Int -> Int
faster_f n = f_list !! n
``````

That performs passably well, and replaces what was going to take O(n^3) time with something that memoizes the intermediate results.

But it still takes linear time just to index to find the memoized answer for `mf`. This means that results like:

``````*Main Data.List> faster_f 123801
248604
``````

are tolerable, but the result doesn't scale much better than that. We can do better!

First, let's define an infinite tree:

``````data Tree a = Tree (Tree a) a (Tree a)
instance Functor Tree where
fmap f (Tree l m r) = Tree (fmap f l) (f m) (fmap f r)
``````

And then we'll define a way to index into it, so we can find a node with index n in O(log n) time instead:

``````index :: Tree a -> Int -> a
index (Tree _ m _) 0 = m
index (Tree l _ r) n = case (n - 1) `divMod` 2 of
(q,0) -> index l q
(q,1) -> index r q
``````

... and we may find a tree full of natural numbers to be convenient so we don't have to fiddle around with those indices:

``````nats :: Tree Int
nats = go 0 1
where
go !n !s = Tree (go l s') n (go r s')
where
l = n + s
r = l + s
s' = s * 2
``````

Since we can index, you can just convert a tree into a list:

``````toList :: Tree a -> [a]
toList as = map (index as) [0..]
``````

You can check the work so far by verifying that `toList nats` gives you `[0..]`

Now,

``````f_tree :: Tree Int
f_tree = fmap (f fastest_f) nats

fastest_f :: Int -> Int
fastest_f = index f_tree
``````

works just like with list above, but instead of taking linear time to find each node, can chase it down in logarithmic time.

The result is considerably faster:

``````*Main> fastest_f 12380192300
67652175206

*Main> fastest_f 12793129379123
120695231674999
``````

In fact it is so much faster that you can go through and replace `Int` with `Integer` above and get ridiculously large answers almost instantaneously

``````*Main> fastest_f' 1230891823091823018203123
93721573993600178112200489

*Main> fastest_f' 12308918230918230182031231231293810923
11097012733777002208302545289166620866358
``````
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This is so wonderful. I will have to remember this trick. –  Theo Belaire May 2 '11 at 21:10
I tried this code and, interestingly, f_faster seemed to be slower than f. I guess those list references really slowed things down. The definition of nats and index seemed pretty mysterious to me, so I've added my own answer which might make things clearer. –  Pitarou Jun 16 '12 at 4:41
i.e. the list version has to create thunks for all nodes in the list, whereas the tree version avoids creating a lot of them. –  Tom Ellis Dec 17 '13 at 8:48
I know this is a rather old post, but shouldn't `f_tree` be defined in a `where` clause to avoid saving unneeded paths in the tree across calls? –  dfeuer Aug 25 '14 at 17:22
The reason for stuffing it in a CAF was that you could get memoization across calls. If I had an expensive call I was memoizing, then I'd probably leave it in a CAF, hence the technique shown here. In a real application there is a trade-off between the benefits and costs of permanent memoization of course. Though, given the question was about how to achieve memoization, I think it'd be misleading to answer with a technique that deliberately avoids memoization across calls, and if nothing else then this commentary here will point folks to the fact that there are subtleties. ;) –  Edward KMETT Aug 26 '14 at 7:47

Not the most efficient way, but does memoize:

``````f = 0 : [ g n | n <- [1..] ]
where g n = max n \$ f!!(n `div` 2) + f!!(n `div` 3) + f!!(n `div` 4)
``````

when requesting `f !! 144`, it is checked that `f !! 143` exists, but its exact value is not calculated. It's still set as some unknown result of a calculation. The only exact values calculated are the ones needed.

So initially, as far as how much has been calculated, the program knows nothing.

``````f = ....
``````

When we make the request `f !! 12`, it starts doing some pattern matching:

``````f = 0 : g 1 : g 2 : g 3 : g 4 : g 5 : g 6 : g 7 : g 8 : g 9 : g 10 : g 11 : g 12 : ...
``````

Now it starts calculating

``````f !! 12 = g 12 = max 12 \$ f!!6 + f!!4 + f!!3
``````

This recursively makes another demand on f, so we calculate

``````f !! 6 = g 6 = max 6 \$ f !! 3 + f !! 2 + f !! 1
f !! 3 = g 3 = max 3 \$ f !! 1 + f !! 1 + f !! 0
f !! 1 = g 1 = max 1 \$ f !! 0 + f !! 0 + f !! 0
f !! 0 = 0
``````

Now we can trickle back up some

``````f !! 1 = g 1 = max 1 \$ 0 + 0 + 0 = 1
``````

Which means the program now knows:

``````f = 0 : 1 : g 2 : g 3 : g 4 : g 5 : g 6 : g 7 : g 8 : g 9 : g 10 : g 11 : g 12 : ...
``````

Continuing to trickle up:

``````f !! 3 = g 3 = max 3 \$ 1 + 1 + 0 = 3
``````

Which means the program now knows:

``````f = 0 : 1 : g 2 : 3 : g 4 : g 5 : g 6 : g 7 : g 8 : g 9 : g 10 : g 11 : g 12 : ...
``````

Now we continue with our calculation of `f!!6`:

``````f !! 6 = g 6 = max 6 \$ 3 + f !! 2 + 1
f !! 2 = g 2 = max 2 \$ f !! 1 + f !! 0 + f !! 0 = max 2 \$ 1 + 0 + 0 = 2
f !! 6 = g 6 = max 6 \$ 3 + 2 + 1 = 6
``````

Which means the program now knows:

``````f = 0 : 1 : 2 : 3 : g 4 : g 5 : 6 : g 7 : g 8 : g 9 : g 10 : g 11 : g 12 : ...
``````

Now we continue with our calculation of `f!!12`:

``````f !! 12 = g 12 = max 12 \$ 6 + f!!4 + 3
f !! 4 = g 4 = max 4 \$ f !! 2 + f !! 1 + f !! 1 = max 4 \$ 2 + 1 + 1 = 4
f !! 12 = g 12 = max 12 \$ 6 + 4 + 3 = 13
``````

Which means the program now knows:

``````f = 0 : 1 : 2 : 3 : 4 : g 5 : 6 : g 7 : g 8 : g 9 : g 10 : g 11 : 13 : ...
``````

So the calculation is done fairly lazily. The program knows that some value for `f !! 8` exists, that it's equal to `g 8`, but it has no idea what `g 8` is.

-
Thanks for this. I'm still very new to Haskell, so there is plenty of stuff in your answer that I need to understand, but I will try it. –  Angel de Vicente Jul 8 '10 at 22:03
Thank you for this one. How would you create and use a 2 dimensional solution space? Would that be a list of lists? and `g n m = (something with) f!!a!!b` –  vikingsteve Jan 6 '14 at 8:21
Sure, you could. For a real solution, though, i'd probably use a memoization library, like memocombinators –  rampion Jan 7 '14 at 3:14

Edward's answer is such a wonderful gem that I've duplicated it and provided implementations of `memoList` and `memoTree` combinators that memoize a function in open-recursive form.

``````{-# LANGUAGE BangPatterns #-}

import Data.Function (fix)

f :: (Integer -> Integer) -> Integer -> Integer
f mf 0 = 0
f mf n = max n \$ mf (div n 2) +
mf (div n 3) +
mf (div n 4)

-- Memoizing using a list

-- The memoizing functionality depends on this being in eta reduced form!
memoList :: ((Integer -> Integer) -> Integer -> Integer) -> Integer -> Integer
memoList f = memoList_f
where memoList_f = (memo !!) . fromInteger
memo = map (f memoList_f) [0..]

faster_f :: Integer -> Integer
faster_f = memoList f

-- Memoizing using a tree

data Tree a = Tree (Tree a) a (Tree a)
instance Functor Tree where
fmap f (Tree l m r) = Tree (fmap f l) (f m) (fmap f r)

index :: Tree a -> Integer -> a
index (Tree _ m _) 0 = m
index (Tree l _ r) n = case (n - 1) `divMod` 2 of
(q,0) -> index l q
(q,1) -> index r q

nats :: Tree Integer
nats = go 0 1
where
go !n !s = Tree (go l s') n (go r s')
where
l = n + s
r = l + s
s' = s * 2

toList :: Tree a -> [a]
toList as = map (index as) [0..]

-- The memoizing functionality depends on this being in eta reduced form!
memoTree :: ((Integer -> Integer) -> Integer -> Integer) -> Integer -> Integer
memoTree f = memoTree_f
where memoTree_f = index memo
memo = fmap (f memoTree_f) nats

fastest_f :: Integer -> Integer
fastest_f = memoTree f
``````
-

When I tried his code, the definitions of `nats` and `index` seemed pretty mysterious, so I write an alternative version that I found easier to understand.

I define `index` and `nats` in terms of `index'` and `nats'`.

`index' t n` is defined over the range `[1..]`. (Recall that `index t` is defined over the range `[0..]`.) It works searches the tree by treating `n` as a string of bits, and reading through the bits in reverse. If the bit is `1`, it takes the right-hand branch. If the bit is `0`, it takes the left-hand branch. It stops when it reaches the last bit (which must be a `1`).

``````index' (Tree l m r) 1 = m
index' (Tree l m r) n = case n `divMod` 2 of
(n', 0) -> index' l n'
(n', 1) -> index' r n'
``````

Just as `nats` is defined for `index` so that `index nats n == n` is always true, `nats'` is defined for `index'`.

``````nats' = Tree l 1 r
where
l = fmap (\n -> n*2)     nats'
r = fmap (\n -> n*2 + 1) nats'
nats' = Tree l 1 r
``````

Now, `nats` and `index` are simply `nats'` and `index'` but with the values shifted by 1:

``````index t n = index' t (n+1)
nats = fmap (\n -> n-1) nats'
``````
-

``````data NatTrie v = NatTrie (NatTrie v) v (NatTrie v)

memo1 arg_to_index index_to_arg f = (\n -> index nats (arg_to_index n))
where nats = go 0 1
go i s = NatTrie (go (i+s) s') (f (index_to_arg i)) (go (i+s') s')
where s' = 2*s
index (NatTrie l v r) i
| i <  0    = f (index_to_arg i)
| i == 0    = v
| otherwise = case (i-1) `divMod` 2 of
(i',0) -> index l i'
(i',1) -> index r i'

memoNat = memo1 id id
``````

Use it as follows to memoize a function with a single integer arg (e.g. fibonacci):

``````fib = memoNat f
where f 0 = 0
f 1 = 1
f n = fib (n-1) + fib (n-2)
``````

Only values for non-negative arguments will be cached.

To also cache values for negative arguments, use `memoInt`, defined as follows:

``````memoInt = memo1 arg_to_index index_to_arg
where arg_to_index n
| n < 0     = -2*n
| otherwise =  2*n + 1
index_to_arg i = case i `divMod` 2 of
(n,0) -> -n
(n,1) ->  n
``````

To cache values for functions with two integer arguments use `memoIntInt`, defined as follows:

``````memoIntInt f = memoInt (\n -> memoInt (f n))
``````
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