import Test.Framework (Test, testGroup)
import Test.Framework.Providers.HUnit (testCase)
import Test.Framework.Providers.QuickCheck2 (testProperty)
-import Test.QuickCheck (Arbitrary(..), Gen, Positive(..), choose)
-
+import Test.QuickCheck ((==>),
+ Arbitrary(..),
+ Gen,
+ Positive(..),
+ Property,
+ choose)
import Assertions
import Comparisons
import Cube (Cube(Cube),
| k < 0 = error "k < 0 in cube_at"
| k >= zsize = error "k >= zsize in cube_at"
| otherwise = Cube delta i j k fvs' tet_vol
- where
+ where
fvs = function_values g
(xsize, ysize, zsize) = dims fvs
fvs' = make_values fvs i j k
k = calculate_containing_cube_coordinate g z
-{-# INLINE zoom_lookup #-}
zoom_lookup :: Values3D -> ScaleFactor -> a -> (R.DIM3 -> Double)
zoom_lookup v3d scale_factor _ =
zoom_result v3d scale_factor
-{-# INLINE zoom_result #-}
zoom_result :: Values3D -> ScaleFactor -> R.DIM3 -> Double
zoom_result v3d (sfx, sfy, sfz) (R.Z R.:. m R.:. n R.:. o) =
f p
zoom v3d scale_factor
| xsize == 0 || ysize == 0 || zsize == 0 = empty3d
| otherwise =
- R.force $ R.unsafeTraverse v3d transExtent (zoom_lookup v3d scale_factor)
+ R.force $ R.unsafeTraverse v3d transExtent f
where
(xsize, ysize, zsize) = dims v3d
transExtent = zoom_shape scale_factor
-
+ f = zoom_lookup v3d scale_factor
-- | Check all coefficients of tetrahedron0 belonging to the cube
| i <- [0..2],
j <- [0..2],
k <- [0..2],
+ c0 <- cs,
t <- tetrahedra c0,
let p = polynomial t,
let i' = fromIntegral i,
let k' = fromIntegral k]
where
g = make_grid 1 trilinear
- c0 = cube_at g 1 1 1
+ cs = [ cube_at g ci cj ck | ci <- [0..2], cj <- [0..2], ck <- [0..2] ]
test_zeros_reproduced :: Assertion
k <- [0..2],
let i' = fromIntegral i,
let j' = fromIntegral j,
- let k' = fromIntegral k]
+ let k' = fromIntegral k,
+ c0 <- cs,
+ t0 <- tetrahedra c0,
+ let p = polynomial t0 ]
where
g = make_grid 1 zeros
- c0 = cube_at g 1 1 1
- t0 = tetrahedron c0 0
- p = polynomial t0
+ cs = [ cube_at g ci cj ck | ci <- [0..2], cj <- [0..2], ck <- [0..2] ]
-- | Make sure we can reproduce a 9x9x9 trilinear from the 3x3x3 one.
idx_z <= zsize - 1
+-- | Given in Sorokina and Zeilfelder, p. 80, (2.9). Note that the
+-- third and fourth indices of c-t10 have been switched. This is
+-- because we store the triangles oriented such that their volume is
+-- positive. If T and T-tilde share \<v1,v2,v3\> and v0,v0-tilde point
+-- in opposite directions, one of them has to have negative volume!
+prop_c0120_identity :: Grid -> Property
+prop_c0120_identity g =
+ and [xsize >= 3, ysize >= 3, zsize >= 3] ==>
+ c t0 0 1 2 0 ~= (c t0 1 0 2 0 + c t10 1 0 0 2) / 2
+ where
+ fvs = function_values g
+ (xsize, ysize, zsize) = dims fvs
+ cube0 = cube_at g 1 1 1
+ cube1 = cube_at g 0 1 1
+ t0 = tetrahedron cube0 0 -- These two tetrahedra share a face.
+ t10 = tetrahedron cube1 10
+
+
+-- | Given in Sorokina and Zeilfelder, p. 80, (2.9). See
+-- 'prop_c0120_identity'.
+prop_c0111_identity :: Grid -> Property
+prop_c0111_identity g =
+ and [xsize >= 3, ysize >= 3, zsize >= 3] ==>
+ c t0 0 1 1 1 ~= (c t0 1 0 1 1 + c t10 1 0 1 1) / 2
+ where
+ fvs = function_values g
+ (xsize, ysize, zsize) = dims fvs
+ cube0 = cube_at g 1 1 1
+ cube1 = cube_at g 0 1 1
+ t0 = tetrahedron cube0 0 -- These two tetrahedra share a face.
+ t10 = tetrahedron cube1 10
+
+
+-- | Given in Sorokina and Zeilfelder, p. 80, (2.9). See
+-- 'prop_c0120_identity'.
+prop_c0201_identity :: Grid -> Property
+prop_c0201_identity g =
+ and [xsize >= 3, ysize >= 3, zsize >= 3] ==>
+ c t0 0 2 0 1 ~= (c t0 1 1 0 1 + c t10 1 1 1 0) / 2
+ where
+ fvs = function_values g
+ (xsize, ysize, zsize) = dims fvs
+ cube0 = cube_at g 1 1 1
+ cube1 = cube_at g 0 1 1
+ t0 = tetrahedron cube0 0 -- These two tetrahedra share a face.
+ t10 = tetrahedron cube1 10
+
+
+-- | Given in Sorokina and Zeilfelder, p. 80, (2.9). See
+-- 'prop_c0120_identity'.
+prop_c0102_identity :: Grid -> Property
+prop_c0102_identity g =
+ and [xsize >= 3, ysize >= 3, zsize >= 3] ==>
+ c t0 0 1 0 2 ~= (c t0 1 0 0 2 + c t10 1 0 2 0) / 2
+ where
+ fvs = function_values g
+ (xsize, ysize, zsize) = dims fvs
+ cube0 = cube_at g 1 1 1
+ cube1 = cube_at g 0 1 1
+ t0 = tetrahedron cube0 0 -- These two tetrahedra share a face.
+ t10 = tetrahedron cube1 10
+
+
+-- | Given in Sorokina and Zeilfelder, p. 80, (2.9). See
+-- 'prop_c0120_identity'.
+prop_c0210_identity :: Grid -> Property
+prop_c0210_identity g =
+ and [xsize >= 3, ysize >= 3, zsize >= 3] ==>
+ c t0 0 2 1 0 ~= (c t0 1 1 1 0 + c t10 1 1 0 1) / 2
+ where
+ fvs = function_values g
+ (xsize, ysize, zsize) = dims fvs
+ cube0 = cube_at g 1 1 1
+ cube1 = cube_at g 0 1 1
+ t0 = tetrahedron cube0 0 -- These two tetrahedra share a face.
+ t10 = tetrahedron cube1 10
+
+
+-- | Given in Sorokina and Zeilfelder, p. 80, (2.9). See
+-- 'prop_c0120_identity'.
+prop_c0300_identity :: Grid -> Property
+prop_c0300_identity g =
+ and [xsize >= 3, ysize >= 3, zsize >= 3] ==>
+ c t0 0 3 0 0 ~= (c t0 1 2 0 0 + c t10 1 2 0 0) / 2
+ where
+ fvs = function_values g
+ (xsize, ysize, zsize) = dims fvs
+ cube0 = cube_at g 1 1 1
+ cube1 = cube_at g 0 1 1
+ t0 = tetrahedron cube0 0 -- These two tetrahedra share a face.
+ t10 = tetrahedron cube1 10
+
+
+-- | All of the properties from Section (2.9), p. 80. These require a
+-- grid since they refer to two adjacent cubes.
+p80_29_properties :: Test.Framework.Test
+p80_29_properties =
+ testGroup "p. 80, Section (2.9) Properties" [
+ testProperty "c0120 identity" prop_c0120_identity,
+ testProperty "c0111 identity" prop_c0111_identity,
+ testProperty "c0201 identity" prop_c0201_identity,
+ testProperty "c0102 identity" prop_c0102_identity,
+ testProperty "c0210 identity" prop_c0210_identity,
+ testProperty "c0300 identity" prop_c0300_identity ]
+
grid_tests :: Test.Framework.Test
grid_tests =
testGroup "Grid Tests" [
trilinear_c0_t0_tests,
+ p80_29_properties,
testCase "tetrahedra collision test isn't too sensitive"
- test_tetrahedra_collision_sensitivity,
- testCase "trilinear reproduced" test_trilinear_reproduced,
- testCase "zeros reproduced" test_zeros_reproduced ]
+ test_tetrahedra_collision_sensitivity,
+ testProperty "cube indices within bounds"
+ prop_cube_indices_never_go_out_of_bounds ]
-- Do the slow tests last so we can stop paying attention.
slow_tests :: Test.Framework.Test
slow_tests =
testGroup "Slow Tests" [
- testProperty "cube indices within bounds"
- prop_cube_indices_never_go_out_of_bounds,
- testCase "trilinear9x9x9 reproduced" test_trilinear9x9x9_reproduced ]
+ testCase "trilinear reproduced" test_trilinear_reproduced,
+ testCase "trilinear9x9x9 reproduced" test_trilinear9x9x9_reproduced,
+ testCase "zeros reproduced" test_zeros_reproduced ]