I'm implementing a motif finding algorithm from the domain of bioinformatics using Haskell. I wont go into the details of the algorithm other then to say it's branch and bound median string search. I had planned on making my implementation more interesting by implementing a concurrent approach (and later an STM approach) in order to get a multicore speed up but after compiling with the follow flags
$ ghc -prof -auto-all -O2 -fllvm -threaded -rtsopts --make main
and printing the profile I saw something interesting (and perhaps obvious):
COST CENTRE entries %time %alloc hammingDistance 34677951 47.6 14.7 motifs 4835446 43.8 71.1
It's clear that a remarkable speedup could be gained without going anywhere near multicore programming (although that's been done and I just need to find some good test data and sort out Criterion for that).
Anyway, both of these functions are purely functional and in no way concurrent. They're also doing quite simple stuff, so I was surprised that they took so much time. Here's the code for them:
data NukeTide = A | T | C | G deriving (Read, Show, Eq, Ord, Enum) type Motif = [NukeTide] hammingDistance :: Motif -> Motif -> Int hammingDistance   = 0 hammingDistance xs  = 0 -- optimistic hammingDistance  ys = 0 -- optimistic hammingDistance (x:xs) (y:ys) = case (x == y) of True -> hammingDistance xs ys False -> 1 + hammingDistance xs ys motifs :: Int -> [a] -> [[a]] motifs n nukeTides = [ take n $ drop k nukeTides | k <- [0..length nukeTides - n] ]
Note that of the two arguments to hammingDistance, I can actually assume that xs is going to be x long and that ys is going to be less than or equal to that, if that opens up room for improvements.
As you can see, hammingDistance calculates the hamming distance between two motifs, which are lists of nucleotides. The motifs function takes a number and a list and returns all the sub strings of that length, e.g.:
> motifs 3 "hello world" ["hel","ell","llo","lo ","o w"," wo","wor","orl","rld"]
Since the algorithmic processes involved are so simple I can't think of a way to optimize this further. I do however have two guesses as to where I should be headed:
- HammingDistance: The data types I'm using (NukeTides and ) are slow/clumsy. This is just a guess, since I'm not familiar with their implementations but I think defining my own datatype, although more legible, probably involves more overhead then I intend. Also the pattern matching is foreign to me, I don't know if that is trivial or costly.
- Motifs: If I'm reading this correctly, 70% of all memory allocations are done by motifs, and I'd assume that has to be garbage collected at some time. Again using the all purpose list might be slowing me down or the list comprehension, since the cost of that is incredibly unclear to me.
Does anybody have any advice on the usual procedure here? If data types are the problem, would arrays be the right answer? (I've heard they come in boxes)
Thanks for the help.
Edit: It just occurred to me that it might be useful if I describe the manner in which these two functions are called:
totalDistance :: Motif -> Int totalDistance motif = sum $ map (minimum . map (hammingDistance motif) . motifs l) dna
This function is the result of another function, and is passed around nodes in a tree. At each node in the tree an evaluation of the nucleotide (of length <= n, that is if == n then it is a leaf node) is done, using totalDistance to score the node. From then on it's your typical branch and bound algorithm.
Edit: John asked that I print out the change I made which virutally eliminated the cost of motifs:
scoreFunction :: DNA -> Int -> (Motif -> Int) scoreFunction dna l = totalDistance where -- The sum of the minimum hamming distance in each line of dna -- is given by totalDistance motif totalDistance motif = sum $ map (minimum . map (hammingDistance motif)) possibleMotifs possibleMotifs = map (motifs l) dna -- Previously this was computed in the line above
I didn't make it clear in my original post, but scoreFunction is only called once, and the result is passed around in a tree traversal/branch and bound and used to evaluate nodes. Recomputing motifs at every step of the way, in retrospect, isn't one of the brightest things I've done.