#if __GLASGOW_HASKELL__ >= 708
module Numeric.LinearAlgebra.Static(
โ, R,
vec2, vec3, vec4, (&), (#), split, headTail,
vector,
linspace, range, dim,
L, Sq, build,
row, col, (ยฆ),(โโ), splitRows, splitCols,
unrow, uncol,
tr,
eye,
diag,
blockAt,
matrix,
C, M, Her, her, ๐,
(<>),(#>),(<ยท>),
linSolve, (<\>),
svd, withCompactSVD, svdTall, svdFlat, Eigen(..),
withNullspace, qr,
mean,
Disp(..), Domain(..),
withVector, withMatrix,
toRows, toColumns,
Sized(..), Diag(..), Sym, sym, mTm, unSym
) where
import GHC.TypeLits
import Numeric.LinearAlgebra.HMatrix hiding (
(<>),(#>),(<ยท>),Konst(..),diag, disp,(ยฆ),(โโ),
row,col,vector,matrix,linspace,toRows,toColumns,
(<\>),fromList,takeDiag,svd,eig,eigSH,eigSH',
eigenvalues,eigenvaluesSH,eigenvaluesSH',build,
qr,size,app,mul,dot)
import qualified Numeric.LinearAlgebra.HMatrix as LA
import Data.Proxy(Proxy)
import Numeric.LinearAlgebra.Static.Internal
import Control.Arrow((***))
ud1 :: R n -> Vector โ
ud1 (R (Dim v)) = v
infixl 4 &
(&) :: forall n . (KnownNat n, 1 <= n)
=> R n -> โ -> R (n+1)
u & x = u # (konst x :: R 1)
infixl 4 #
(#) :: forall n m . (KnownNat n, KnownNat m)
=> R n -> R m -> R (n+m)
(R u) # (R v) = R (vconcat u v)
vec2 :: โ -> โ -> R 2
vec2 a b = R (gvec2 a b)
vec3 :: โ -> โ -> โ -> R 3
vec3 a b c = R (gvec3 a b c)
vec4 :: โ -> โ -> โ -> โ -> R 4
vec4 a b c d = R (gvec4 a b c d)
vector :: KnownNat n => [โ] -> R n
vector = fromList
matrix :: (KnownNat m, KnownNat n) => [โ] -> L m n
matrix = fromList
linspace :: forall n . KnownNat n => (โ,โ) -> R n
linspace (a,b) = v
where
v = mkR (LA.linspace (size v) (a,b))
range :: forall n . KnownNat n => R n
range = v
where
v = mkR (LA.linspace d (1,fromIntegral d))
d = size v
dim :: forall n . KnownNat n => R n
dim = v
where
v = mkR (scalar (fromIntegral $ size v))
ud2 :: L m n -> Matrix โ
ud2 (L (Dim (Dim x))) = x
diag :: KnownNat n => R n -> Sq n
diag = diagR 0
eye :: KnownNat n => Sq n
eye = diag 1
blockAt :: forall m n . (KnownNat m, KnownNat n) => โ -> Int -> Int -> Matrix Double -> L m n
blockAt x r c a = res
where
z = scalar x
z1 = LA.konst x (r,c)
z2 = LA.konst x (max 0 (m'(ra+r)), max 0 (n'(ca+c)))
ra = min (rows a) . max 0 $ m'r
ca = min (cols a) . max 0 $ n'c
sa = subMatrix (0,0) (ra, ca) a
(m',n') = size res
res = mkL $ fromBlocks [[z1,z,z],[z,sa,z],[z,z,z2]]
row :: R n -> L 1 n
row = mkL . asRow . ud1
col v = tr . row $ v
unrow :: L 1 n -> R n
unrow = mkR . head . LA.toRows . ud2
uncol v = unrow . tr $ v
infixl 2 โโ
(โโ) :: (KnownNat r1, KnownNat r2, KnownNat c) => L r1 c -> L r2 c -> L (r1+r2) c
a โโ b = mkL (extract a LA.โโ extract b)
infixl 3 ยฆ
a ยฆ b = tr (tr a โโ tr b)
type Sq n = L n n
type GL = forall n m. (KnownNat n, KnownNat m) => L m n
type GSq = forall n. KnownNat n => Sq n
isKonst :: forall m n . (KnownNat m, KnownNat n) => L m n -> Maybe (โ,(Int,Int))
isKonst s@(unwrap -> x)
| singleM x = Just (x `atIndex` (0,0), (size s))
| otherwise = Nothing
isKonstC :: forall m n . (KnownNat m, KnownNat n) => M m n -> Maybe (โ,(Int,Int))
isKonstC s@(unwrap -> x)
| singleM x = Just (x `atIndex` (0,0), (size s))
| otherwise = Nothing
infixr 8 <>
(<>) :: forall m k n. (KnownNat m, KnownNat k, KnownNat n) => L m k -> L k n -> L m n
(<>) = mulR
infixr 8 #>
(#>) :: (KnownNat m, KnownNat n) => L m n -> R n -> R m
(#>) = appR
infixr 8 <ยท>
(<ยท>) :: R n -> R n -> โ
(<ยท>) = dotR
class Diag m d | m -> d
where
takeDiag :: m -> d
instance forall n . (KnownNat n) => Diag (L n n) (R n)
where
takeDiag m = mkR (LA.takeDiag (extract m))
instance forall m n . (KnownNat m, KnownNat n, m <= n+1) => Diag (L m n) (R m)
where
takeDiag m = mkR (LA.takeDiag (extract m))
instance forall m n . (KnownNat m, KnownNat n, n <= m+1) => Diag (L m n) (R n)
where
takeDiag m = mkR (LA.takeDiag (extract m))
linSolve :: (KnownNat m, KnownNat n) => L m m -> L m n -> Maybe (L m n)
linSolve (extract -> a) (extract -> b) = fmap mkL (LA.linearSolve a b)
(<\>) :: (KnownNat m, KnownNat n, KnownNat r) => L m n -> L m r -> L n r
(extract -> a) <\> (extract -> b) = mkL (a LA.<\> b)
svd :: (KnownNat m, KnownNat n) => L m n -> (L m m, R n, L n n)
svd (extract -> m) = (mkL u, mkR s', mkL v)
where
(u,s,v) = LA.svd m
s' = vjoin [s, z]
z = LA.konst 0 (max 0 (cols m LA.size s))
svdTall :: (KnownNat m, KnownNat n, n <= m) => L m n -> (L m n, R n, L n n)
svdTall (extract -> m) = (mkL u, mkR s, mkL v)
where
(u,s,v) = LA.thinSVD m
svdFlat :: (KnownNat m, KnownNat n, m <= n) => L m n -> (L m m, R m, L n m)
svdFlat (extract -> m) = (mkL u, mkR s, mkL v)
where
(u,s,v) = LA.thinSVD m
class Eigen m l v | m -> l, m -> v
where
eigensystem :: m -> (l,v)
eigenvalues :: m -> l
newtype Sym n = Sym (Sq n) deriving Show
sym :: KnownNat n => Sq n -> Sym n
sym m = Sym $ (m + tr m)/2
mTm :: (KnownNat m, KnownNat n) => L m n -> Sym n
mTm x = Sym (tr x <> x)
unSym :: Sym n -> Sq n
unSym (Sym x) = x
๐ :: Sized โ s c => s
๐ = konst iC
newtype Her n = Her (M n n)
her :: KnownNat n => M n n -> Her n
her m = Her $ (m + LA.tr m)/2
instance KnownNat n => Eigen (Sym n) (R n) (L n n)
where
eigenvalues (Sym (extract -> m)) = mkR . LA.eigenvaluesSH' $ m
eigensystem (Sym (extract -> m)) = (mkR l, mkL v)
where
(l,v) = LA.eigSH' m
instance KnownNat n => Eigen (Sq n) (C n) (M n n)
where
eigenvalues (extract -> m) = mkC . LA.eigenvalues $ m
eigensystem (extract -> m) = (mkC l, mkM v)
where
(l,v) = LA.eig m
withNullspace
:: forall m n z . (KnownNat m, KnownNat n)
=> L m n
-> (forall k . (KnownNat k) => L n k -> z)
-> z
withNullspace (LA.nullspace . extract -> a) f =
case someNatVal $ fromIntegral $ cols a of
Nothing -> error "static/dynamic mismatch"
Just (SomeNat (_ :: Proxy k)) -> f (mkL a :: L n k)
withCompactSVD
:: forall m n z . (KnownNat m, KnownNat n)
=> L m n
-> (forall k . (KnownNat k) => (L m k, R k, L n k) -> z)
-> z
withCompactSVD (LA.compactSVD . extract -> (u,s,v)) f =
case someNatVal $ fromIntegral $ LA.size s of
Nothing -> error "static/dynamic mismatch"
Just (SomeNat (_ :: Proxy k)) -> f (mkL u :: L m k, mkR s :: R k, mkL v :: L n k)
qr :: (KnownNat m, KnownNat n) => L m n -> (L m m, L m n)
qr (extract -> x) = (mkL q, mkL r)
where
(q,r) = LA.qr x
split :: forall p n . (KnownNat p, KnownNat n, p<=n) => R n -> (R p, R (np))
split (extract -> v) = ( mkR (subVector 0 p' v) ,
mkR (subVector p' (LA.size v p') v) )
where
p' = fromIntegral . natVal $ (undefined :: Proxy p) :: Int
headTail :: (KnownNat n, 1<=n) => R n -> (โ, R (n1))
headTail = ((!0) . extract *** id) . split
splitRows :: forall p m n . (KnownNat p, KnownNat m, KnownNat n, p<=m) => L m n -> (L p n, L (mp) n)
splitRows (extract -> x) = ( mkL (takeRows p' x) ,
mkL (dropRows p' x) )
where
p' = fromIntegral . natVal $ (undefined :: Proxy p) :: Int
splitCols :: forall p m n. (KnownNat p, KnownNat m, KnownNat n, KnownNat (np), p<=n) => L m n -> (L m p, L m (np))
splitCols = (tr *** tr) . splitRows . tr
toRows :: forall m n . (KnownNat m, KnownNat n) => L m n -> [R n]
toRows (LA.toRows . extract -> vs) = map mkR vs
toColumns :: forall m n . (KnownNat m, KnownNat n) => L m n -> [R m]
toColumns (LA.toColumns . extract -> vs) = map mkR vs
build
:: forall m n . (KnownNat n, KnownNat m)
=> (โ -> โ -> โ)
-> L m n
build f = r
where
r = mkL $ LA.build (size r) f
withVector
:: forall z
. Vector โ
-> (forall n . (KnownNat n) => R n -> z)
-> z
withVector v f =
case someNatVal $ fromIntegral $ LA.size v of
Nothing -> error "static/dynamic mismatch"
Just (SomeNat (_ :: Proxy m)) -> f (mkR v :: R m)
withMatrix
:: forall z
. Matrix โ
-> (forall m n . (KnownNat m, KnownNat n) => L m n -> z)
-> z
withMatrix a f =
case someNatVal $ fromIntegral $ rows a of
Nothing -> error "static/dynamic mismatch"
Just (SomeNat (_ :: Proxy m)) ->
case someNatVal $ fromIntegral $ cols a of
Nothing -> error "static/dynamic mismatch"
Just (SomeNat (_ :: Proxy n)) ->
f (mkL a :: L m n)
class Domain field vec mat | mat -> vec field, vec -> mat field, field -> mat vec
where
mul :: forall m k n. (KnownNat m, KnownNat k, KnownNat n) => mat m k -> mat k n -> mat m n
app :: forall m n . (KnownNat m, KnownNat n) => mat m n -> vec n -> vec m
dot :: forall n . (KnownNat n) => vec n -> vec n -> field
cross :: vec 3 -> vec 3 -> vec 3
diagR :: forall m n k . (KnownNat m, KnownNat n, KnownNat k) => field -> vec k -> mat m n
instance Domain โ R L
where
mul = mulR
app = appR
dot = dotR
cross = crossR
diagR = diagRectR
instance Domain โ C M
where
mul = mulC
app = appC
dot = dotC
cross = crossC
diagR = diagRectC
mulR :: forall m k n. (KnownNat m, KnownNat k, KnownNat n) => L m k -> L k n -> L m n
mulR (isKonst -> Just (a,(_,k))) (isKonst -> Just (b,_)) = konst (a * b * fromIntegral k)
mulR (isDiag -> Just (0,a,_)) (isDiag -> Just (0,b,_)) = diagR 0 (mkR v :: R k)
where
v = a' * b'
n = min (LA.size a) (LA.size b)
a' = subVector 0 n a
b' = subVector 0 n b
mulR (isDiag -> Just (0,a,_)) (extract -> b) = mkL (asColumn a * takeRows (LA.size a) b)
mulR (extract -> a) (isDiag -> Just (0,b,_)) = mkL (takeColumns (LA.size b) a * asRow b)
mulR a b = mkL (extract a LA.<> extract b)
appR :: (KnownNat m, KnownNat n) => L m n -> R n -> R m
appR (isDiag -> Just (0, w, _)) v = mkR (w * subVector 0 (LA.size w) (extract v))
appR m v = mkR (extract m LA.#> extract v)
dotR :: R n -> R n -> โ
dotR (ud1 -> u) (ud1 -> v)
| singleV u || singleV v = sumElements (u * v)
| otherwise = udot u v
crossR :: R 3 -> R 3 -> R 3
crossR (extract -> x) (extract -> y) = vec3 z1 z2 z3
where
z1 = x!1*y!2x!2*y!1
z2 = x!2*y!0x!0*y!2
z3 = x!0*y!1x!1*y!0
mulC :: forall m k n. (KnownNat m, KnownNat k, KnownNat n) => M m k -> M k n -> M m n
mulC (isKonstC -> Just (a,(_,k))) (isKonstC -> Just (b,_)) = konst (a * b * fromIntegral k)
mulC (isDiagC -> Just (0,a,_)) (isDiagC -> Just (0,b,_)) = diagR 0 (mkC v :: C k)
where
v = a' * b'
n = min (LA.size a) (LA.size b)
a' = subVector 0 n a
b' = subVector 0 n b
mulC (isDiagC -> Just (0,a,_)) (extract -> b) = mkM (asColumn a * takeRows (LA.size a) b)
mulC (extract -> a) (isDiagC -> Just (0,b,_)) = mkM (takeColumns (LA.size b) a * asRow b)
mulC a b = mkM (extract a LA.<> extract b)
appC :: (KnownNat m, KnownNat n) => M m n -> C n -> C m
appC (isDiagC -> Just (0, w, _)) v = mkC (w * subVector 0 (LA.size w) (extract v))
appC m v = mkC (extract m LA.#> extract v)
dotC :: KnownNat n => C n -> C n -> โ
dotC (unwrap -> u) (unwrap -> v)
| singleV u || singleV v = sumElements (conj u * v)
| otherwise = u LA.<ยท> v
crossC :: C 3 -> C 3 -> C 3
crossC (extract -> x) (extract -> y) = mkC (LA.fromList [z1, z2, z3])
where
z1 = x!1*y!2x!2*y!1
z2 = x!2*y!0x!0*y!2
z3 = x!0*y!1x!1*y!0
diagRectR :: forall m n k . (KnownNat m, KnownNat n, KnownNat k) => โ -> R k -> L m n
diagRectR x v
| m' == 1 = mkL (LA.diagRect x ev m' n')
| m'*n' > 0 = r
| otherwise = matrix []
where
r = mkL (asRow (vjoin [scalar x, ev, zeros]))
ev = extract v
zeros = LA.konst x (max 0 ((min m' n') LA.size ev))
(m',n') = size r
diagRectC :: forall m n k . (KnownNat m, KnownNat n, KnownNat k) => โ -> C k -> M m n
diagRectC x v
| m' == 1 = mkM (LA.diagRect x ev m' n')
| m'*n' > 0 = r
| otherwise = fromList []
where
r = mkM (asRow (vjoin [scalar x, ev, zeros]))
ev = extract v
zeros = LA.konst x (max 0 ((min m' n') LA.size ev))
(m',n') = size r
mean :: (KnownNat n, 1<=n) => R n -> โ
mean v = v <ยท> (1/dim)
test :: (Bool, IO ())
test = (ok,info)
where
ok = extract (eye :: Sq 5) == ident 5
&& (unwrap .unSym) (mTm sm :: Sym 3) == tr ((3><3)[1..]) LA.<> (3><3)[1..]
&& unwrap (tm :: L 3 5) == LA.matrix 5 [1..15]
&& thingS == thingD
&& precS == precD
&& withVector (LA.vector [1..15]) sumV == sumElements (LA.fromList [1..15])
info = do
print $ u
print $ v
print (eye :: Sq 3)
print $ ((u & 5) + 1) <ยท> v
print (tm :: L 2 5)
print (tm <> sm :: L 2 3)
print thingS
print thingD
print precS
print precD
print $ withVector (LA.vector [1..15]) sumV
splittest
sumV w = w <ยท> konst 1
u = vec2 3 5
๐ง x = vector [x] :: R 1
v = ๐ง 2 & 4 & 7
tm :: GL
tm = lmat 0 [1..]
lmat :: forall m n . (KnownNat m, KnownNat n) => โ -> [โ] -> L m n
lmat z xs = r
where
r = mkL . reshape n' . LA.fromList . take (m'*n') $ xs ++ repeat z
(m',n') = size r
sm :: GSq
sm = lmat 0 [1..]
thingS = (u & 1) <ยท> tr q #> q #> v
where
q = tm :: L 10 3
thingD = vjoin [ud1 u, 1] LA.<ยท> tr m LA.#> m LA.#> ud1 v
where
m = LA.matrix 3 [1..30]
precS = (1::Double) + (2::Double) * ((1 :: R 3) * (u & 6)) <ยท> konst 2 #> v
precD = 1 + 2 * vjoin[ud1 u, 6] LA.<ยท> LA.konst 2 (LA.size (ud1 u) +1, LA.size (ud1 v)) LA.#> ud1 v
splittest
= do
let v = range :: R 7
a = snd (split v) :: R 4
print $ a
print $ snd . headTail . snd . headTail $ v
print $ first (vec3 1 2 3)
print $ second (vec3 1 2 3)
print $ third (vec3 1 2 3)
print $ (snd $ splitRows eye :: L 4 6)
where
first v = fst . headTail $ v
second v = first . snd . headTail $ v
third v = first . snd . headTail . snd . headTail $ v
instance (KnownNat n', KnownNat m') => Testable (L n' m')
where
checkT _ = test
#else
module Numeric.LinearAlgebra.Static
where
#endif