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# Expensive operations on floats in Haskell

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 `x`and `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
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

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
``````\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