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I have a function in Haskell that operates on 2 (large) lists of floats and returns a list of floats. I started with a simple summation, and am now looking for a more complicated operation that will take longer. That's right - I really want to get slower!

I tried the following:

listOp :: (Floating a) => [a]->[a]->[a]
listOp _ [] = []
listOp [] _ = []
listOp (x:xs) (y:ys) = (sqrt ((x/y) / (y/x))) : (listOp xs ys)

Because of my (Win32) memory constraints, the lists are restricted to a length of 4 million when using Double. The contents are randomly generated and evaluation is forced on the lists.

I takes about 5 seconds to generate each of the input lists. I've tried various operations looking for an expensive operation x+y, x*y, (x**y)**(y**x) but the result list is always calculated sub 1 second (unless my timing code is bad).

Any suggestions for an expensive operation I could use on xand y? Are the trig functions (sin, cos, etc) good candidates?

Thanks.

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Why don't you use laziness to let the lists stream? Than you can get arbitrary long lists in constant memory. –  FUZxxl Sep 11 '11 at 16:30
    
What are you doing to the resulting list? Unless you make sure to force every element of the list nothing will happen. And, btw, use zipWith instead of rolling your own. –  augustss Sep 11 '11 at 16:30
    
@FUZxxl I have reasons for not wanting lazy lists - I didn't want to muddy the waters with tangential discussions so I left them out. –  Alp Sep 11 '11 at 16:34
    
@augustss I am forcing every element of the list. Thanks for the zipWith hint - that can come at the end. –  Alp Sep 11 '11 at 16:36
3  
Can you tell us more of the problem context? Given the information provided, I can't think of any possible point. –  John L Sep 11 '11 at 19:32
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3 Answers 3

Just iterate some function like sin N times where you can tune N until it's slow enough. That will keep the FPU busy, which you seem to want for some reason.

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A nicely tunable expensive function is the Ackermann function. The runtime of the Ackermann function increases very rapidly -- it increases more quickly than exponential.

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"More quickly than exponential" is a bit of an understatement here. I'm pretty sure the Ackermann function is overkill for what the OP needs. –  leftaroundabout Sep 11 '11 at 17:03
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\x y -> unsafePerformIO (threadDelay 1000000 >> return x + y)

For CPU-y goodness, busy-loop.

loop 0 = ()
loop x = loop (x-1)
\x y -> loop 1000000000 `seq` x + y
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Thanks, but I'm looking for a genuinely expensive operation that will keep the CPU busy doing some work. I should have made that clear, sorry. –  Alp Sep 11 '11 at 16:30
    
Updated answer to peg your CPU. –  Daniel Wagner Sep 11 '11 at 16:34
    
On higher optimization levels (i.e. those that are worth benchmarking), that's probably optimized to seq () (x + y) and then to x + y. –  delnan Sep 11 '11 at 17:41
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