X-Git-Url: https://gitweb.michael.orlitzky.com/?a=blobdiff_plain;f=src%2FTetrahedron.hs;h=1f7c22b355c0392f26988a1d9c315e63fee2d68e;hb=b2e1c440b9b1bb99ae564d6600230bbd1f7d204c;hp=73ed58863595cab2da3bd8a4a0e98cd2f5f69ad4;hpb=603d9155a29bfbc353b42a6c880edce224626a16;p=spline3.git diff --git a/src/Tetrahedron.hs b/src/Tetrahedron.hs index 73ed588..1f7c22b 100644 --- a/src/Tetrahedron.hs +++ b/src/Tetrahedron.hs @@ -6,6 +6,7 @@ import Prelude hiding (LT) import Test.QuickCheck (Arbitrary(..), Gen) import Cardinal +import Comparisons (nearly_ge) import FunctionValues import Misc (factorial) import Point @@ -16,7 +17,8 @@ data Tetrahedron = Tetrahedron { fv :: FunctionValues, v0 :: Point, v1 :: Point, v2 :: Point, - v3 :: Point } + v3 :: Point, + precomputed_volume :: Double } deriving (Eq) @@ -27,7 +29,11 @@ instance Arbitrary Tetrahedron where rnd_v2 <- arbitrary :: Gen Point rnd_v3 <- arbitrary :: Gen Point rnd_fv <- arbitrary :: Gen FunctionValues - return (Tetrahedron rnd_fv rnd_v0 rnd_v1 rnd_v2 rnd_v3) + -- We can't assign an incorrect precomputed volume, + -- so we have to calculate the correct one here. + let t' = Tetrahedron rnd_fv rnd_v0 rnd_v1 rnd_v2 rnd_v3 0 + let vol = volume t' + return (Tetrahedron rnd_fv rnd_v0 rnd_v1 rnd_v2 rnd_v3 vol) instance Show Tetrahedron where @@ -42,7 +48,28 @@ instance Show Tetrahedron where instance ThreeDimensional Tetrahedron where center t = ((v0 t) + (v1 t) + (v2 t) + (v3 t)) `scale` (1/4) contains_point t p = - (b0 t p) >= 0 && (b1 t p) >= 0 && (b2 t p) >= 0 && (b3 t p) >= 0 + b0_unscaled `nearly_ge` 0 && + b1_unscaled `nearly_ge` 0 && + b2_unscaled `nearly_ge` 0 && + b3_unscaled `nearly_ge` 0 + where + -- Drop the useless division and volume calculation that we + -- would do if we used the regular b0,..b3 functions. + b0_unscaled :: Double + b0_unscaled = volume inner_tetrahedron + where inner_tetrahedron = t { v0 = p } + + b1_unscaled :: Double + b1_unscaled = volume inner_tetrahedron + where inner_tetrahedron = t { v1 = p } + + b2_unscaled :: Double + b2_unscaled = volume inner_tetrahedron + where inner_tetrahedron = t { v2 = p } + + b3_unscaled :: Double + b3_unscaled = volume inner_tetrahedron + where inner_tetrahedron = t { v3 = p } polynomial :: Tetrahedron -> (RealFunction Point) @@ -243,27 +270,27 @@ volume t -- | The barycentric coordinates of a point with respect to v0. b0 :: Tetrahedron -> (RealFunction Point) -b0 t point = (volume inner_tetrahedron) / (volume t) +b0 t point = (volume inner_tetrahedron) / (precomputed_volume t) where inner_tetrahedron = t { v0 = point } -- | The barycentric coordinates of a point with respect to v1. b1 :: Tetrahedron -> (RealFunction Point) -b1 t point = (volume inner_tetrahedron) / (volume t) +b1 t point = (volume inner_tetrahedron) / (precomputed_volume t) where inner_tetrahedron = t { v1 = point } -- | The barycentric coordinates of a point with respect to v2. b2 :: Tetrahedron -> (RealFunction Point) -b2 t point = (volume inner_tetrahedron) / (volume t) +b2 t point = (volume inner_tetrahedron) / (precomputed_volume t) where inner_tetrahedron = t { v2 = point } -- | The barycentric coordinates of a point with respect to v3. b3 :: Tetrahedron -> (RealFunction Point) -b3 t point = (volume inner_tetrahedron) / (volume t) +b3 t point = (volume inner_tetrahedron) / (precomputed_volume t) where inner_tetrahedron = t { v3 = point }