{-# OPTIONS -fglasgow-exts #-} ----------------------------------------------------------------------------- {-| Module : SolidTexture.hs Copyright : (c) David Harley 2010 Project : qtHaskell Version : 1.1.4 Modified : 2010-09-02 17:02:43 Warning : this file is machine generated - do not modify. --} ----------------------------------------------------------------------------- module Qt.Glome.SolidTexture ( square_wave, triangle_wave, sine_wave , perlin, stripe, noise, turbulence ) where import Qt.Glome.Clr import Qt.Glome.Vec import Data.Array.IArray square_wave :: Flt -> Flt square_wave x = let offset = x - (fromIntegral (floor x)) in if offset < 0.5 then 0 else 1 triangle_wave :: Flt -> Flt triangle_wave x = let offset = x - (fromIntegral (floor x)) in if offset < 0.5 then (offset*2) else (2-(offset*2)) sine_wave :: Flt -> Flt sine_wave x = (sin (x*2*pi))*0.5 + 0.5 lump_wave :: Flt -> Flt lump_wave x = 1 - x*x*x stripe :: Vec -> (Flt -> Flt) -> (Vec -> Flt) stripe axis interp = let len = vlen axis in (\pos -> let offset = vdot pos axis in interp offset) omega :: Flt -> Flt omega t_ = let t = fabs t_ tsqr = t*t tcube = tsqr*t in (-6)*tcube*tsqr + 15*tcube*t - 10*tcube + 1 phi :: Array Int Int phi = listArray (0,11) [3,0,2,7,4,1,5,11,8,10,9,6] grad :: Array Int Vec grad = listArray (0,11) $ filter (\x -> let l = vlen x in l < 1.5 && l > 1.1) [Vec x y z | x <- [(-1),0,1], y <- [(-1),0,1], z <- [(-1),0,1]] gamma :: Int -> Int -> Int -> Vec gamma i j k = let a = phi!(mod (iabs k) 12) b = phi!(mod (iabs (j+a)) 12) c = phi!(mod (iabs (i+b)) 12) in grad!c knot :: Int -> Int -> Int -> Vec -> Flt knot i j k v = let Vec x y z = v in (omega x) * (omega y) * (omega z) * (vdot (gamma i j k) v) intGamma :: Int -> Int -> Int intGamma i j = let a = phi!(mod (iabs j) 16) b = phi!(mod (iabs (i+a)) 16) in b turbulence :: Vec -> Int -> Flt turbulence p 1 = fabs(noise(p)) turbulence p n = let newp = vscale p 0.5 t = fabs (noise p) in t + (0.5 * (turbulence newp (n-1))) noise :: Vec -> Flt noise (Vec x y z) = let i = floor x j = floor y k = floor z u = x-(fromIntegral i) v = y-(fromIntegral j) w = z-(fromIntegral k) in knot i j k (Vec u v w) + knot (i+1) j k (Vec (u-1) v w) + knot i (j+1) k (Vec u (v-1) w) + knot i j (k+1) (Vec u v (w-1)) + knot (i+1) (j+1) k (Vec (u-1) (v-1) w) + knot (i+1) j (k+1) (Vec (u-1) v (w-1)) + knot i (j+1) (k+1) (Vec u (v-1) (w-1)) + knot (i+1) (j+1) (k+1) (Vec (u-1) (v-1) (w-1)) perlin :: Vec -> Flt perlin v = let p = ((noise v)+1)*0.5 in if p > 1 then error $ "perlin noise error, 1 < " ++ (show p) else if p < 0 then error $ "perlin noise error, 0 > " ++ (show p) else p perlin_turb :: Vec -> Int -> Flt perlin_turb v l = let p = turbulence v l in if p > 1 then error $ "perlin turbulence error, 1 < " ++ (show p) else if p < 0 then error $ "perlin turbulence error, 0 > " ++ (show p) else p