X-Git-Url: http://gitweb.michael.orlitzky.com/?a=blobdiff_plain;f=src%2FLinear%2FVector.hs;fp=src%2FLinear%2FVector.hs;h=d728334db0c05d75e85b057bb01f992b008e3e9a;hb=2d0ecad8695e129443e53311d6494b2465f1a672;hp=9774dcd40c8132413ddd541a2a65be8976a462e1;hpb=303c5e7bba583f08e59bc6c848be8e75c1155a3b;p=numerical-analysis.git diff --git a/src/Linear/Vector.hs b/src/Linear/Vector.hs index 9774dcd..d728334 100644 --- a/src/Linear/Vector.hs +++ b/src/Linear/Vector.hs @@ -63,7 +63,7 @@ instance Vector D4 a where -- -- Examples: -- --- >>> let v1 = Vec2D 1 2 +-- >>> let v1 = D2 1 2 -- >>> v1 ! 1 -- 2 -- @@ -74,7 +74,7 @@ instance Vector D4 a where -- -- Examples: -- --- >>> let v1 = Vec3D 1 2 3 +-- >>> let v1 = D3 1 2 3 -- >>> v1 !? 2 -- Just 3 -- >>> v1 !? 3 @@ -84,54 +84,3 @@ instance Vector D4 a where (!?) v1 idx | idx < 0 || idx >= V.length v1 = Nothing | otherwise = Just $ v1 ! idx - - - - ---instance (RealFloat a, Ord a, Vector v a) => Normed (Vn v a) where - -- | The infinity norm. We don't use V.maximum here because it - -- relies on a type constraint that the vector be non-empty and I - -- don't know how to pattern match it away. - -- - -- Examples: - -- - -- >>> let v1 = make3d (1,5,2) - -- >>> norm_infty v1 - -- 5 - -- --- norm_infty (Vn v1) = realToFrac $ V.foldl max 0 v1 - - -- | Generic p-norms. The usual norm in R^n is (norm_p 2). - -- - -- Examples: - -- - -- >>> let v1 = make2d (3,4) - -- >>> norm_p 1 v1 - -- 7.0 - -- >>> norm_p 2 v1 - -- 5.0 - -- --- norm_p p (Vn v1) = --- realToFrac $ root $ V.sum $ V.map (exponentiate . abs) v1 --- where --- exponentiate = (** (fromIntegral p)) --- root = (** (recip (fromIntegral p))) - - - - - --- | Convenient constructor for 2D vectors. --- --- Examples: --- --- >>> import Roots.Simple --- >>> let h = 0.5 :: Double --- >>> let g1 (Vn (Vec2D x y)) = 1.0 + h*exp(-(x^2))/(1.0 + y^2) --- >>> let g2 (Vn (Vec2D x y)) = 0.5 + h*atan(x^2 + y^2) --- >>> let g u = make2d ((g1 u), (g2 u)) --- >>> let u0 = make2d (1.0, 1.0) --- >>> let eps = 1/(10^9) --- >>> fixed_point g eps u0 --- (1.0728549599342185,1.0820591495686167) ---