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I am looking for a data structure in Haskell that supports both fast indexing and fast append. This is for a memoization problem which arises from recursion.

From the way vectors work in c++ (which are mutable, but that shouldn't matter in this case) it seems immutable vectors with both (amortized) O(1) append and O(1) indexing should be possible (ok, it's not, see comments to this question). Is this poossible in Haskell or should I go with Data.Sequence which has (AFAICT anyway) O(1) append and O(log(min(i,n-i))) indexing?

On a related note, as a Haskell newbie I find myself longing for a practical, concise guide to Haskell data structures. Ideally this would give a fairly comprehensive overview over the most practical data structures along with performance characteristics and pointers to Haskell libraries where they are implemented. It seems that there is a lot of information out there, but I have found it to be a little scattered. Am I asking too much?

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  • I'm pretty sure no such data structure exists. If all your appends happen linearly, use Data.Vector since fusion will give you the performance you want, otherwise use Data.Sequence
    – Philip JF
    May 3, 2012 at 21:56
  • Thanks. I think it should be possible, but maybe to specialized ... Can you explain what you mean by 'all your appends happend linearly'? Do you mean with linearly increasing indices? It seems with vector each operation would still be O(n) ...
    – Paul
    May 3, 2012 at 22:01
  • basically, if you can think of the vector as being "threaded" through your code in a way that doesn't save intermediate values, the appends can be "fused" into a single operation.
    – Philip JF
    May 3, 2012 at 22:03
  • "From the way vectors work in c++ (which are mutable, but that shouldn't matter in this case) it seems immutable vectors with both O(1) append and O(1) indexing should be possible". How do you imagine such a data structure to work? How would it avoid copying the data on insertion and still have O(1) complexity for that operation? In short, I think you're wrong here. The mutability of the C++ vector does matter here.
    – Niklas B.
    May 3, 2012 at 22:03
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    @Paul: Well, immutability requires that you could perform the append operation on the same base vector with two different values and it should yield two different vectors as a result. That's just impossible with the scheme you describe (the vector would have to be copied at least once).
    – Niklas B.
    May 3, 2012 at 22:10

3 Answers 3

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For simple memoization problems, you typically want to build the table once and then not modify it later. In that case, you can avoid having to worry about appending, by instead thinking of the construction of the memoization table as one operation.

One method is to take advantage of lazy evaluation and refer to the table while we're constructing it.

import Data.Array
fibs = listArray (0, n-1) $ 0 : 1 : [fibs!(i-1) + fibs!(i-2) | i <- [2..n-1]]
  where n = 100

This method is especially useful when the dependencies between the elements of the table makes it difficult to come up with a simple order of evaluating them ahead of time. However, it requires using boxed arrays or vectors, which may make this approach unsuitable for large tables due to the extra overhead.

For unboxed vectors, you have operations like constructN which lets you build a table in a pure way while using mutation underneath to make it efficient. It does this by giving the function you pass an immutable view of the prefix of the vector constructed so far, which you can then use to compute the next element.

import Data.Vector.Unboxed as V
fibs = constructN 100 f
  where f xs | i < 2 = i
             | otherwise = xs!(i-1) + xs!(i-2)
             where i = V.length xs
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  • Wow, this constructN is swank. May 4, 2012 at 0:13
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    I could be mistaken, but I think that is going to exceed the size of Int and there is no Unbox Integer instance in Data.Vector.Unboxed.
    – Doug Moore
    May 4, 2012 at 1:07
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    @DougMoore: Yes, this will overflow. The point was to illustrate memoization, not to provide a good way of computing Fibonacci numbers. For that, there are much better algorithms which don't require any memoization :)
    – hammar
    May 4, 2012 at 1:11
  • @hammar I know, it just isn't often that I get to make a comment. :)
    – Doug Moore
    May 4, 2012 at 1:14
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    @hammar Thank you for this answer. I am not quite sure if my problem is simple enough to fit this approach (it uses the memoization fixpoint function + a function which gives the terminal state + an update rule which takes a (persumably) memoized version of itself). I'll have to think about it a bit.
    – Paul
    May 4, 2012 at 7:15
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If memory serves, C++ vectors are implemented as an array with bounds and size information. When an insertion would increase the bounds beyond the size, the size is doubled. This is amortized O(1) time insertion (not O(1) as you claim), and can be emulated just fine in Haskell using the Array type, perhaps with suitable IO or ST prepended.

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    Yes, it is amortized O(1), I know, forgot to mention it. I will checkout Array, do you have a good source for learning about it in conjunction with IO or ST? I would prefer the code to be pure if at all possible and have no experience with the ST monad.
    – Paul
    May 3, 2012 at 22:03
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    This code isn't going to be pure. That's just not possible. Mutability versus non-mutability does make the difference. May 3, 2012 at 22:04
  • @Paul Lazy Functional State Threads is the original ST paper, I guess. May 3, 2012 at 22:07
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    @Paul I've done the first 1% of writing a library that does this and stuck it on hpaste. I waive whatever copyrights I had left after I uploaded it to hpaste. You'll probably want to expand the API, change the names, benchmark, and do all that good stuff, but it should at least give you a flavor of programming in the ST monad to get you started with. May 3, 2012 at 22:52
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    In a pure CS universe you can have both: an infinite sized array with a pointer to the last element used--no copying necessary. Okay, perhaps you dont believe in infinite sized, but clearly we can make recopies as infrequent as we desire by just using a larger block of RAM. Exponentially growing dynamic arrays are optimal in the meaningful dimensions.
    – Philip JF
    May 4, 2012 at 4:41
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Take a look at this to make a more informed choice of what you should use.

But the simple thing is, if you want the equivalent of a C++ vector, use Data.Vector.

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  • they also have the advantage of a safe indexing operator which array is missing for some reason
    – JonnyRaa
    Jul 12, 2019 at 11:48

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