module Math.HiddenMarkovModel.Utility where
import qualified Numeric.LAPACK.Matrix.Triangular as Triangular
import qualified Numeric.LAPACK.Matrix.Hermitian as Hermitian
import qualified Numeric.LAPACK.Matrix.Shape as MatrixShape
import qualified Numeric.LAPACK.Matrix.Square as Square
import qualified Numeric.LAPACK.Matrix as Matrix
import qualified Numeric.LAPACK.Vector as Vector
import Numeric.LAPACK.Matrix.Triangular (Diagonal)
import Numeric.LAPACK.Vector (Vector)
import qualified Numeric.Netlib.Class as Class
import qualified Data.Array.Comfort.Storable as StorableArray
import qualified Data.Array.Comfort.Boxed as Array
import qualified Data.Array.Comfort.Shape as Shape
import Foreign.Storable (Storable)
import qualified System.Random as Rnd
import qualified Control.Monad.Trans.State as MS
type SquareMatrix sh = Square.Square sh
normalizeProb :: (Shape.C sh, Class.Real a) => Vector sh a -> Vector sh a
normalizeProb = snd . normalizeFactor
normalizeFactor :: (Shape.C sh, Class.Real a) => Vector sh a -> (a, Vector sh a)
normalizeFactor xs =
let c = Vector.sum xs
in (c, Vector.scale (recip c) xs)
randomItemProp ::
(Rnd.RandomGen g, Rnd.Random b, Num b, Ord b) =>
[(a,b)] -> MS.State g a
randomItemProp props =
let (keys,ps) = unzip props
in do p <- MS.state (Rnd.randomR (0, sum ps))
return $
fst $ head $ dropWhile ((0<=) . snd) $
zip keys $ tail $ scanl (-) p ps
attachOnes :: (Num b) => [a] -> [(a,b)]
attachOnes = map (flip (,) 1)
vectorDim :: Shape.C sh => Vector sh a -> Int
vectorDim = Shape.size . StorableArray.shape
singleton :: (Class.Real a) => a -> Vector () a
singleton = Vector.constant ()
hermitianFromList ::
(Shape.C sh, Storable a) => sh -> [a] -> Hermitian.Hermitian sh a
hermitianFromList = Hermitian.fromList MatrixShape.RowMajor
squareConstant ::
(Shape.C sh, Class.Real a) => sh -> a -> SquareMatrix sh a
squareConstant = Vector.constant . MatrixShape.square MatrixShape.RowMajor
squareFromLists ::
(Shape.C sh, Eq sh, Storable a) => sh -> [Vector sh a] -> SquareMatrix sh a
squareFromLists sh =
Square.fromGeneral . Matrix.fromRowArray sh . Array.fromList sh
diagonal :: (Shape.C sh, Class.Real a) => Vector sh a -> Diagonal sh a
diagonal = Triangular.diagonal MatrixShape.RowMajor