Convert Integration/Simpson.hs and Integration/Trapezoid.hs to numeric-prelude.

[numerical-analysis.git] / src / Integration / Simpson.hs

diff --git a/src/Integration/Simpson.hs b/src/Integration/Simpson.hs
index 2481f850b3bf6e15d7c7fac25c9c65de7d8b6be1..c3d59ff797c0538c377a08196065a63b43178003 100644 (file)
--- a/src/Integration/Simpson.hs
+++ b/src/Integration/Simpson.hs
@@ -1,8 +1,17 @@
+{-# LANGUAGE RebindableSyntax #-}
+
 module Integration.Simpson
 where
 
 import Misc (partition)
 
+import NumericPrelude hiding (abs)
+import Algebra.Absolute (abs)
+import qualified Algebra.Field as Field
+import qualified Algebra.RealField as RealField
+import qualified Algebra.RealRing as RealRing
+import qualified Algebra.ToInteger as ToInteger
+import qualified Algebra.ToRational as ToRational
 
 -- | Use the Simpson's rule to numerically integrate @f@ over the
 --   interval [@a@, @b@].
@@ -30,7 +39,7 @@ import Misc (partition)
 --   >>> simpson_1 f 0 1
 --   0.25
 --
-simpson_1 :: (RealFrac a, Fractional b, Num b)
+simpson_1 :: (RealField.C a, ToRational.C a, RealField.C b)
             => (a -> b) -- ^ The function @f@
             -> a       -- ^ The \"left\" endpoint, @a@
             -> a       -- ^ The \"right\" endpoint, @b@
@@ -38,7 +47,7 @@ simpson_1 :: (RealFrac a, Fractional b, Num b)
 simpson_1 f a b =
   coefficient * ((f a) + 4*(f midpoint) + (f b))
   where
-    coefficient = (realToFrac (b - a)) / 6
+    coefficient = (fromRational' $ toRational (b - a)) / 6
     midpoint = (a + b) / 2
 
 
@@ -59,7 +68,11 @@ simpson_1 f a b =
 --   >>> abs (area - 2) < 0.00001
 --   True
 --
-simpson :: (RealFrac a, Fractional b, Num b, Integral c)
+simpson :: (RealField.C a,
+            ToRational.C a,
+            RealField.C b,
+            ToInteger.C c,
+            Enum c)
           => c -- ^ The number of subintervals to use, @n@
           -> (a -> b) -- ^ The function @f@
           -> a       -- ^ The \"left\" endpoint, @a@