module Grid
where
-import Cube (Cube(Cube))
+import Test.QuickCheck (Arbitrary(..), Gen, Positive(..))
+
+import Cube (Cube(Cube), find_containing_tetrahedra)
import FunctionValues
+import Misc (flatten)
+import Point (Point)
+import Tetrahedron (polynomial)
+import Values (Values3D, dims, empty3d, zoom_shape)
+
+import qualified Data.Array.Repa as R
-- | Our problem is defined on a Grid. The grid size is given by the
-- positive number h. The function values are the values of the
-- function at the grid points, which are distance h from one
-- another in each direction (x,y,z).
data Grid = Grid { h :: Double, -- MUST BE GREATER THAN ZERO!
- function_values :: [[[Double]]] }
+ function_values :: Values3D }
deriving (Eq, Show)
+instance Arbitrary Grid where
+ arbitrary = do
+ (Positive h') <- arbitrary :: Gen (Positive Double)
+ fvs <- arbitrary :: Gen Values3D
+ return (make_grid h' fvs)
+
+
-- | The constructor that we want people to use. If we're passed a
-- non-positive grid size, we throw an error.
-make_grid :: Double -> [[[Double]]] -> Grid
+make_grid :: Double -> Values3D -> Grid
make_grid grid_size values
| grid_size <= 0 = error "grid size must be positive"
| otherwise = Grid grid_size values
-- | Creates an empty grid with grid size 1.
empty_grid :: Grid
-empty_grid = Grid 1 [[[]]]
+empty_grid = Grid 1 empty3d
-- | Returns a three-dimensional list of cubes centered on the grid
-- points of g with the appropriate 'FunctionValues'.
cubes :: Grid -> [[[Cube]]]
cubes g
- | fvs == [[[]]] = [[[]]]
- | head fvs == [[]] = [[[]]]
+ | xsize == 0 || ysize == 0 || zsize == 0 = [[[]]]
| otherwise =
[[[ Cube (h g) i j k (make_values fvs i j k) | i <- [0..xsize]]
| j <- [0..ysize]]
| k <- [0..zsize]]
where
fvs = function_values g
- zsize = (length fvs) - 1
- ysize = (length $ head fvs) - 1
- xsize = (length $ head $ head fvs) - 1
+ (xsize, ysize, zsize) = dims fvs
-- | Takes a grid and a position as an argument and returns the cube
| j >= length ((cubes g) !! i) = Nothing
| k >= length (((cubes g) !! i) !! j) = Nothing
| otherwise = Just $ (((cubes g) !! i) !! j) !! k
+
+
+
+-- The first cube along any axis covers (-h/2, h/2). The second
+-- covers (h/2, 3h/2). The third, (3h/2, 5h/2), and so on.
+--
+-- We translate the (x,y,z) coordinates forward by 'h' so that the
+-- first covers (0, h), the second covers (h, 2h), etc. This makes
+-- it easy to figure out which cube contains the given point.
+calculate_containing_cube_coordinate :: Grid -> Double -> Int
+calculate_containing_cube_coordinate g coord
+ -- Don't use a cube on the boundary if we can help it.
+ | coord == delta && (xsize > 0 && ysize > 0 && zsize > 0) = 1
+ | otherwise = (ceiling ( (coord + delta) / cube_width )) - 1
+ where
+ (xsize, ysize, zsize) = dims (function_values g)
+ delta = (h g)
+ cube_width = 2 * delta
+
+
+-- | Takes a 'Grid', and returns a 'Cube' containing the given 'Point'.
+-- Since our grid is rectangular, we can figure this out without having
+-- to check every cube.
+find_containing_cube :: Grid -> Point -> Cube
+find_containing_cube g p =
+ case cube_at g i j k of
+ Just c -> c
+ Nothing -> error "No cube contains the given point."
+ where
+ (x, y, z) = p
+ i = calculate_containing_cube_coordinate g x
+ j = calculate_containing_cube_coordinate g y
+ k = calculate_containing_cube_coordinate g z
+
+
+{-# INLINE zoom_lookup #-}
+zoom_lookup :: Grid -> a -> (R.DIM3 -> Double)
+zoom_lookup g _ = zoom_result g
+
+
+{-# INLINE zoom_result #-}
+zoom_result :: Grid -> R.DIM3 -> Double
+zoom_result g (R.Z R.:. i R.:. j R.:. k) =
+ f p
+ where
+ i' = fromIntegral i
+ j' = fromIntegral j
+ k' = fromIntegral k
+ p = (i', j', k') :: Point
+ c = find_containing_cube g p
+ t = head (find_containing_tetrahedra c p)
+ f = polynomial t
+
+
+zoom :: Grid -> Int -> Values3D
+zoom g scale_factor
+ | xsize == 0 || ysize == 0 || zsize == 0 = empty3d
+ | otherwise =
+ R.force $ R.traverse arr transExtent (zoom_lookup g)
+ where
+ arr = function_values g
+ (xsize, ysize, zsize) = dims arr
+ transExtent = zoom_shape scale_factor
projects / spline3.git / blobdiff