X-Git-Url: http://gitweb.michael.orlitzky.com/?a=blobdiff_plain;f=src%2FGrid.hs;h=647ec574f08b5338ce58042f9a54c9d3fcec3ff8;hb=3f0b6b7faecc561af0b7312a11c73a44a1b416f6;hp=742360f5d799993f47ce2cb38adf3f3cfc46ae6f;hpb=3b111f8df1bde25f32f3d5378844cbcf34404015;p=spline3.git diff --git a/src/Grid.hs b/src/Grid.hs index 742360f..647ec57 100644 --- a/src/Grid.hs +++ b/src/Grid.hs @@ -10,7 +10,6 @@ module Grid ( ) where -import Data.Array (Array, array, (!)) import qualified Data.Array.Repa as R import Test.HUnit import Test.Framework (Test, testGroup) @@ -33,16 +32,12 @@ import ThreeDimensional import Values (Values3D, dims, empty3d, zoom_shape) -type CubeGrid = Array (Int,Int,Int) Cube - - -- | 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 :: Values3D, - cube_grid :: CubeGrid } + function_values :: Values3D } deriving (Eq, Show) @@ -58,28 +53,8 @@ instance Arbitrary Grid where make_grid :: Double -> Values3D -> Grid make_grid grid_size values | grid_size <= 0 = error "grid size must be positive" - | otherwise = Grid grid_size values (cubes grid_size values) - - --- | Returns a three-dimensional array of cubes centered on the grid --- points (h*i, h*j, h*k) with the appropriate 'FunctionValues'. -cubes :: Double -> Values3D -> CubeGrid -cubes delta fvs - = array (lbounds, ubounds) - [ ((i,j,k), cube_ijk) - | i <- [0..xmax], - j <- [0..ymax], - k <- [0..zmax], - let tet_vol = (1/24)*(delta^(3::Int)), - let cube_ijk = - Cube delta i j k (make_values fvs i j k) tet_vol] - where - xmax = xsize - 1 - ymax = ysize - 1 - zmax = zsize - 1 - lbounds = (0, 0, 0) - ubounds = (xmax, ymax, zmax) - (xsize, ysize, zsize) = dims fvs + | otherwise = Grid grid_size values + -- | Takes a grid and a position as an argument and returns the cube @@ -93,10 +68,13 @@ cube_at g i j k | j >= ysize = error "j >= ysize in cube_at" | k < 0 = error "k < 0 in cube_at" | k >= zsize = error "k >= zsize in cube_at" - | otherwise = (cube_grid g) ! (i,j,k) - where + | otherwise = Cube delta i j k fvs' tet_vol + where fvs = function_values g (xsize, ysize, zsize) = dims fvs + fvs' = make_values fvs i j k + delta = h g + tet_vol = (1/24)*(delta^(3::Int)) -- 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. @@ -132,16 +110,17 @@ find_containing_cube g p = {-# INLINE zoom_lookup #-} -zoom_lookup :: Grid -> ScaleFactor -> a -> (R.DIM3 -> Double) -zoom_lookup g scale_factor _ = - zoom_result g scale_factor +zoom_lookup :: Values3D -> ScaleFactor -> a -> (R.DIM3 -> Double) +zoom_lookup v3d scale_factor _ = + zoom_result v3d scale_factor {-# INLINE zoom_result #-} -zoom_result :: Grid -> ScaleFactor -> R.DIM3 -> Double -zoom_result g (sfx, sfy, sfz) (R.Z R.:. m R.:. n R.:. o) = +zoom_result :: Values3D -> ScaleFactor -> R.DIM3 -> Double +zoom_result v3d (sfx, sfy, sfz) (R.Z R.:. m R.:. n R.:. o) = f p where + g = make_grid 1 v3d offset = (h g)/2 m' = (fromIntegral m) / (fromIntegral sfx) - offset n' = (fromIntegral n) / (fromIntegral sfy) - offset @@ -150,20 +129,19 @@ zoom_result g (sfx, sfy, sfz) (R.Z R.:. m R.:. n R.:. o) = cube = find_containing_cube g p t = find_containing_tetrahedron cube p f = polynomial t - -zoom :: Grid -> ScaleFactor -> Values3D -zoom g scale_factor + + +zoom :: Values3D -> ScaleFactor -> Values3D +zoom v3d scale_factor | xsize == 0 || ysize == 0 || zsize == 0 = empty3d | otherwise = - R.force $ R.unsafeTraverse arr transExtent (zoom_lookup g scale_factor) + R.force $ R.unsafeTraverse v3d transExtent (zoom_lookup v3d scale_factor) where - arr = function_values g - (xsize, ysize, zsize) = dims arr + (xsize, ysize, zsize) = dims v3d transExtent = zoom_shape scale_factor - -- | Check all coefficients of tetrahedron0 belonging to the cube -- centered on (1,1,1) with a grid constructed from the trilinear -- values. See example one in the paper.