# Optimizing numerical array performance in Haskell

I'm working on a terrain generation algorithm for a MineCraft-like world. Currently, I'm using simplex noise based on the implementation in the paper 'Simplex Noise Demystified' [PDF], since simplex noise is supposed to be faster and to have fewer artifacts than Perlin noise. This looks fairly decent (see image), but so far it's also pretty slow.

Running the noise function 10 times (I need noise with different wavelengths for things like terrain height, temperature, tree location, etc.) with 3 octaves of noise for each block in a chunk (16x16x128 blocks), or about 1 million calls to the noise function in total, takes about 700-800 ms. This is at least an order of magnitude too slow for the purposes of generating terrain with any decent kind of speed, despite the fact that there are no obvious expensive operations in the algorithm (at least to me). Just floor, modulo, some array lookups and basic arithmetic. The algorithm (written in Haskell) is listed below. The SCC comments are for profiling. I've omitted the 2D noise functions, since they work the same way.

``````g3 :: (Floating a, RealFrac a) => a
g3 = 1/6

{-# INLINE int #-}
int :: (Integral a, Num b) => a -> b
int = fromIntegral

grad3 :: (Floating a, RealFrac a) => V.Vector (a,a,a)
grad3 = V.fromList \$ [(1,1,0),(-1, 1,0),(1,-1, 0),(-1,-1, 0),
(1,0,1),(-1, 0,1),(1, 0,-1),(-1, 0,-1),
(0,1,1),( 0,-1,1),(0, 1,-1),( 0,-1,-1)]

{-# INLINE dot3 #-}
dot3 :: Num a => (a, a, a) -> a -> a -> a -> a
dot3 (a,b,c) x y z = a * x + b * y + c * z

{-# INLINE fastFloor #-}
fastFloor :: RealFrac a => a -> Int
fastFloor x = truncate (if x > 0 then x else x - 1)

--Generate a random permutation for use in the noise functions
perm :: Int -> Permutation
perm seed = V.fromList . concat . replicate 2 . shuffle' [0..255] 256 \$ mkStdGen seed

--Generate 3D noise between -0.5 and 0.5
simplex3D :: (Floating a, RealFrac a) => Permutation -> a -> a -> a -> a
simplex3D p x y z = {-# SCC "out" #-} 16 * (n gi0 (x0,y0,z0) + n gi1 xyz1 + n gi2 xyz2 + n gi3 xyz3) where
(i,j,k) = {-# SCC "ijk" #-} (s x, s y, s z) where s a = fastFloor (a + (x + y + z) / 3)
(x0,y0,z0) = {-# SCC "x0-z0" #-} (x - int i + t, y - int j + t, z - int k + t) where t = int (i + j + k) * g3
(i1,j1,k1,i2,j2,k2) = {-# SCC "i1-k2" #-} if x0 >= y0
then if y0 >= z0 then (1,0,0,1,1,0) else
if x0 >= z0 then (1,0,0,1,0,1) else (0,0,1,1,0,1)
else if y0 <  z0 then (0,0,1,0,1,1) else
if x0 <  z0 then (0,1,0,0,1,1) else (0,1,0,1,1,0)
xyz1 = {-# SCC "xyz1" #-} (x0 - int i1 +   g3, y0 - int j1 +   g3, z0 - int k1 +   g3)
xyz2 = {-# SCC "xyz2" #-} (x0 - int i2 + 2*g3, y0 - int j2 + 2*g3, z0 - int k2 + 2*g3)
xyz3 = {-# SCC "xyz3" #-} (x0 - 1      + 3*g3, y0 - 1      + 3*g3, z0 - 1      + 3*g3)
(ii,jj,kk) = {-# SCC "iijjkk" #-} (i .&. 255, j .&. 255, k .&. 255)
gi0 = {-# SCC "gi0" #-} mod (p V.! (ii +      p V.! (jj +      p V.!  kk      ))) 12
gi1 = {-# SCC "gi1" #-} mod (p V.! (ii + i1 + p V.! (jj + j1 + p V.! (kk + k1)))) 12
gi2 = {-# SCC "gi2" #-} mod (p V.! (ii + i2 + p V.! (jj + j2 + p V.! (kk + k2)))) 12
gi3 = {-# SCC "gi3" #-} mod (p V.! (ii + 1  + p V.! (jj + 1  + p V.! (kk + 1 )))) 12
{-# INLINE n #-}
n gi (x',y',z') = {-# SCC "n" #-} (\a -> if a < 0 then 0 else
a*a*a*a*dot3 (grad3 V.! gi) x' y' z') \$ 0.6 - x'*x' - y'*y' - z'*z'

harmonic :: (Num a, Fractional a) => Int -> (a -> a) -> a
harmonic octaves noise = f octaves / (2 - 1 / int (2 ^ (octaves - 1))) where
f 0 = 0
f o = let r = int \$ 2 ^ (o - 1) in noise r / r + f (o - 1)

--Generate harmonic 3D noise between -0.5 and 0.5
harmonicNoise3D :: (RealFrac a, Floating a) => Permutation -> Int -> a -> a -> a -> a -> a
harmonicNoise3D p octaves l x y z = harmonic octaves
(\f -> simplex3D p (x * f / l) (y * f / l) (z * f / l))
``````

For profiling, I used the following code,

``````q _ = let p = perm 0 in
sum [harmonicNoise3D p 3 l x y z :: Float | l <- [1..10], y <- [0..127], x <- [0..15], z <- [0..15]]

main = do start <- getCurrentTime
print \$ q ()
end <- getCurrentTime
print \$ diffUTCTime end start
``````

which produces the following information:

``````COST CENTRE                    MODULE               %time %alloc

simplex3D                      Main                  18.8   21.0
n                              Main                  18.0   19.6
out                            Main                  10.1    9.2
harmonicNoise3D                Main                   9.8    4.5
harmonic                       Main                   6.4    5.8
int                            Main                   4.0    2.9
gi3                            Main                   4.0    3.0
xyz2                           Main                   3.5    5.9
gi1                            Main                   3.4    3.4
gi0                            Main                   3.4    2.7
fastFloor                      Main                   3.2    0.6
xyz1                           Main                   2.9    5.9
ijk                            Main                   2.7    3.5
gi2                            Main                   2.7    3.3
xyz3                           Main                   2.6    4.1
iijjkk                         Main                   1.6    2.5
dot3                           Main                   1.6    0.7
``````

To compare, I also ported the algorithm to C#. Performance there was about 3 to 4 times faster, so I imagine I must be doing something wrong. But even then it's not nearly as fast as I would like. So my question is this: can anyone tell me if there are any ways to speed up my implementation and/or the algorithm in general or does anyone know of a different noise algorithm that has better performance characteristics but a similar look?

Update:

After following some of the suggestions offered below, the code now looks as follows:

``````module Noise ( Permutation, perm
, noise3D, simplex3D
) where

import Data.Bits
import qualified Data.Vector.Unboxed as UV
import System.Random
import System.Random.Shuffle

type Permutation = UV.Vector Int

g3 :: Double
g3 = 1/6

{-# INLINE int #-}
int :: Int -> Double
int = fromIntegral

grad3 :: UV.Vector (Double, Double, Double)
grad3 = UV.fromList \$ [(1,1,0),(-1, 1,0),(1,-1, 0),(-1,-1, 0),
(1,0,1),(-1, 0,1),(1, 0,-1),(-1, 0,-1),
(0,1,1),( 0,-1,1),(0, 1,-1),( 0,-1,-1)]

{-# INLINE dot3 #-}
dot3 :: (Double, Double, Double) -> Double -> Double -> Double -> Double
dot3 (a,b,c) x y z = a * x + b * y + c * z

{-# INLINE fastFloor #-}
fastFloor :: Double -> Int
fastFloor x = truncate (if x > 0 then x else x - 1)

--Generate a random permutation for use in the noise functions
perm :: Int -> Permutation
perm seed = UV.fromList . concat . replicate 2 . shuffle' [0..255] 256 \$ mkStdGen seed

--Generate 3D noise between -0.5 and 0.5
noise3D :: Permutation -> Double -> Double -> Double -> Double
noise3D p x y z = 16 * (n gi0 (x0,y0,z0) + n gi1 xyz1 + n gi2 xyz2 + n gi3 xyz3) where
(i,j,k) = (s x, s y, s z) where s a = fastFloor (a + (x + y + z) / 3)
(x0,y0,z0) = (x - int i + t, y - int j + t, z - int k + t) where t = int (i + j + k) * g3
(i1,j1,k1,i2,j2,k2) = if x0 >= y0
then if y0 >= z0 then (1,0,0,1,1,0) else
if x0 >= z0 then (1,0,0,1,0,1) else (0,0,1,1,0,1)
else if y0 <  z0 then (0,0,1,0,1,1) else
if x0 <  z0 then (0,1,0,0,1,1) else (0,1,0,1,1,0)
xyz1 = (x0 - int i1 +   g3, y0 - int j1 +   g3, z0 - int k1 +   g3)
xyz2 = (x0 - int i2 + 2*g3, y0 - int j2 + 2*g3, z0 - int k2 + 2*g3)
xyz3 = (x0 - 1      + 3*g3, y0 - 1      + 3*g3, z0 - 1      + 3*g3)
(ii,jj,kk) = (i .&. 255, j .&. 255, k .&. 255)
gi0 = rem (UV.unsafeIndex p (ii +      UV.unsafeIndex p (jj +      UV.unsafeIndex p  kk      ))) 12
gi1 = rem (UV.unsafeIndex p (ii + i1 + UV.unsafeIndex p (jj + j1 + UV.unsafeIndex p (kk + k1)))) 12
gi2 = rem (UV.unsafeIndex p (ii + i2 + UV.unsafeIndex p (jj + j2 + UV.unsafeIndex p (kk + k2)))) 12
gi3 = rem (UV.unsafeIndex p (ii + 1  + UV.unsafeIndex p (jj + 1  + UV.unsafeIndex p (kk + 1 )))) 12
{-# INLINE n #-}
n gi (x',y',z') = (\a -> if a < 0 then 0 else
a*a*a*a*dot3 (UV.unsafeIndex grad3 gi) x' y' z') \$ 0.6 - x'*x' - y'*y' - z'*z'

harmonic :: Int -> (Double -> Double) -> Double
harmonic octaves noise = f octaves / (2 - 1 / int (2 ^ (octaves - 1))) where
f 0 = 0
f o = let r = 2 ^^ (o - 1) in noise r / r + f (o - 1)

--3D simplex noise
--syntax: simplex3D permutation number_of_octaves wavelength x y z
simplex3D :: Permutation -> Int -> Double -> Double -> Double -> Double -> Double
simplex3D p octaves l x y z = harmonic octaves
(\f -> noise3D p (x * f / l) (y * f / l) (z * f / l))
``````

Together with reducing my chunk size to 8x8x128, generating new terrain chunks now occurs at about 10-20 fps, which means moving around is now not nearly as problematic as before. Of course, any other performance improvements are still welcome.

-
I'm guessing you're importing `Data.Vector.Unboxed` ? And the `random-shuffle` package? And the `permutation` package? –  Don Stewart Apr 18 '11 at 18:42
Ah, ok, not using the `Unboxed` vector type. And `Permutation` is `V.Vector Int`. –  Don Stewart Apr 18 '11 at 18:50
Yes, I'm using random-shuffle package and the Vector are plain Data.Vector. Permutation is indeed just a type synonym for V.Vector Int. –  FalconNL Apr 18 '11 at 18:58
Just an aside, this project looks really cool! Glad to see this sort of work in Haskell. –  acfoltzer Apr 18 '11 at 21:20
If you could post the complete code, after the performance improvements, I could see if there's anything else that could be optimized. –  tibbe Apr 19 '11 at 5:56

The thing that stands out initially is that your code is highly polymorphic. You should specialize your floating point type uniformly to `Double`, so GHC (and LLVM) have a chance of applying more aggressive optimizations.

Note, for those trying to reproduce, this code imports:

``````import qualified Data.Vector as V
import Data.Bits
import Data.Time.Clock
import System.Random
import System.Random.Shuffle

type Permutation = V.Vector Int
``````

Ok. There's lots of things you can try to improve this code.

Improvements

Data representation

• Specialize to a concrete floating point type, instead of polymorphic floating point functions
• Replace tuple `(a,a,a)` with unboxed triple `T !Double !Double !Double`
• Switch from `Data.Array` to `Data.Array.Unboxed` for `Permutations`
• Replace use of boxed array of triples with multidimensional unboxed array from `repa` package

Compiler flags

• Compile with `-O2 -fvia-C -optc-O3 -fexcess-precision -optc-march=native` (or equivalent with `-fllvm`)
• Increase spec constr threshold -- `-fspec-constr-count=16`

More efficient library functions

• Use mersenne-random instead of StdGen to generate randoms
• Replace `mod` with `rem`
• Replace `V.!` indexing with unchecked indexing `VU.unsafeIndex` (after moving to `Data.Vector.Unboxed`

Runtime settings

• Increase the default allocation area: `-A20M` or `-H`

Also, check your algorithm is identical to the C# one, and you're using the same data structures.

-
For those who didn't see the pre-edit answer, "that" in FalconNL's comment is specializing the polymorphic functions to `Double`. Almost 4x improvement, not bad. –  Thomas M. DuBuisson Apr 18 '11 at 19:27
Update: Unboxing the triples, -fexcess-precision and upping the spec-constr threshold do not appear to provide any tangible benefits. The mersenne-random replacement won't matter too much for performance since the permutation is only calculated once, and it doesn't work with random-shuffle since it's not an instance of RandomGen. The quality of the rng also isn't too much of a problem, since all it does is generate the permutation, which in itself is a glorified seed. –  FalconNL Apr 18 '11 at 19:57
If it's necessary to manually specialize the code to Double then the compiler is broken. An advantage of Haskell is to be able to write generic code, so let's make sure than works. –  augustss Apr 18 '11 at 21:02
Update: Switched all Vectors to Unboxed Vectors. 1 million calls currently take around 480 ms, so that's about 1.5 to 2 times faster than the original (the fps count depends on more code than just the noise, hence the different multiplier). –  FalconNL Apr 18 '11 at 23:08
Putting a SPECIALIZE pragma on the polymorphic definition might be enough. If not, try to use INLINABLE. –  tibbe Apr 19 '11 at 5:55