{-# LANGUAGE RebindableSyntax #-} {-# LANGUAGE MultiParamTypeClasses #-} {-# LANGUAGE FlexibleInstances #-} {- | Copyright : (c) Henning Thielemann 2004-2006 Maintainer : numericprelude@henning-thielemann.de Stability : provisional Portability : requires multi-parameter type classes Polynomials with negative and positive exponents. -} module MathObj.LaurentPolynomial where import qualified MathObj.Polynomial as Poly import qualified MathObj.PowerSeries as PS import qualified MathObj.PowerSeries.Core as PSCore import qualified Algebra.VectorSpace as VectorSpace import qualified Algebra.Module as Module import qualified Algebra.Vector as Vector import qualified Algebra.Field as Field import qualified Algebra.Ring as Ring import qualified Algebra.Additive as Additive import qualified Algebra.ZeroTestable as ZeroTestable import qualified Number.Complex as Complex import Algebra.Module((*>)) import qualified NumericPrelude.Base as P import qualified NumericPrelude.Numeric as NP import NumericPrelude.Base hiding (const, reverse, ) import NumericPrelude.Numeric hiding (div, negate, ) import qualified Data.List as List import Data.List.HT (mapAdjacent) {- | Polynomial including negative exponents -} data T a = Cons {expon :: Int, coeffs :: [a]} {- * Basic Operations -} const :: a -> T a const x = fromCoeffs [x] (!) :: Additive.C a => T a -> Int -> a (!) (Cons xt x) n = if n<xt then zero else head (drop (n-xt) x ++ [zero]) fromCoeffs :: [a] -> T a fromCoeffs = fromShiftCoeffs 0 fromShiftCoeffs :: Int -> [a] -> T a fromShiftCoeffs = Cons fromPolynomial :: Poly.T a -> T a fromPolynomial = fromCoeffs . Poly.coeffs fromPowerSeries :: PS.T a -> T a fromPowerSeries = fromCoeffs . PS.coeffs bounds :: T a -> (Int, Int) bounds (Cons xt x) = (xt, xt + length x - 1) shift :: Int -> T a -> T a shift t (Cons xt x) = Cons (xt+t) x {-# DEPRECATED translate "In order to avoid confusion with Polynomial.translate, use 'shift' instead" #-} translate :: Int -> T a -> T a translate = shift instance Functor T where fmap f (Cons xt xs) = Cons xt (map f xs) {- * Show -} appPrec :: Int appPrec = 10 instance (Show a) => Show (T a) where showsPrec p (Cons xt xs) = showParen (p >= appPrec) (showString "LaurentPolynomial.Cons " . shows xt . showString " " . shows xs) {- * Additive -} add :: Additive.C a => T a -> T a -> T a add (Cons _ []) y = y add x (Cons _ []) = x add (Cons xt x) (Cons yt y) = if xt < yt then Cons xt (addShifted (yt-xt) x y) else Cons yt (addShifted (xt-yt) y x) {- Compute the value of a series of Laurent polynomials. Requires that the start exponents constitute a (weakly) rising sequence, where each exponent occurs only finitely often. Cf. Synthesizer.Cut.arrange -} series :: (Additive.C a) => [T a] -> T a series [] = fromCoeffs [] series ps = let es = map expon ps xs = map coeffs ps ds = mapAdjacent subtract es in Cons (head es) (addShiftedMany ds xs) {- | Add lists of numbers respecting a relative shift between the starts of the lists. The shifts must be non-negative. The list of relative shifts is one element shorter than the list of summands. Infinitely many summands are permitted, provided that runs of zero shifts are all finite. We could add the lists either with 'foldl' or with 'foldr', 'foldl' would be straightforward, but more time consuming (quadratic time) whereas foldr is not so obvious but needs only linear time. (stars denote the coefficients, frames denote what is contained in the interim results) 'foldl' sums this way: > | | | ******************************* > | | +-------------------------------- > | | ************************ > | +---------------------------------- > | ************ > +------------------------------------ I.e. 'foldl' would use much time find the time differences by successive subtraction 1. 'foldr' mixes this way: > +-------------------------------- > | ******************************* > | +------------------------- > | | ************************ > | | +------------- > | | | ************ -} addShiftedMany :: (Additive.C a) => [Int] -> [[a]] -> [a] addShiftedMany ds xss = foldr (uncurry addShifted) [] (zip (ds++[0]) xss) addShifted :: Additive.C a => Int -> [a] -> [a] -> [a] addShifted del px py = let recurse 0 x = PSCore.add x py recurse d [] = replicate d zero ++ py recurse d (x:xs) = x : recurse (d-1) xs in if del >= 0 then recurse del px else error "LaurentPolynomial.addShifted: negative shift" negate :: Additive.C a => T a -> T a negate (Cons xt x) = Cons xt (map NP.negate x) sub :: Additive.C a => T a -> T a -> T a sub x y = add x (negate y) instance Additive.C a => Additive.C (T a) where zero = fromCoeffs [] (+) = add (-) = sub negate = negate {- * Module -} instance Vector.C T where zero = zero (<+>) = (+) (*>) = Vector.functorScale instance (Module.C a b) => Module.C a (T b) where x *> Cons yt ys = Cons yt (x *> ys) instance (Field.C a, Module.C a b) => VectorSpace.C a (T b) {- * Ring -} mul :: Ring.C a => T a -> T a -> T a mul (Cons xt x) (Cons yt y) = Cons (xt+yt) (PSCore.mul x y) instance (Ring.C a) => Ring.C (T a) where one = const one fromInteger n = const (fromInteger n) (*) = mul {- * Field.C -} div :: (Field.C a, ZeroTestable.C a) => T a -> T a -> T a div (Cons xt xs) (Cons yt ys) = let (xzero,x) = span isZero xs (yzero,y) = span isZero ys in Cons (xt - yt + length xzero - length yzero) (PSCore.divide x y) instance (Field.C a, ZeroTestable.C a) => Field.C (T a) where (/) = div divExample :: T NP.Rational divExample = div (Cons 1 [0,0,1,2,1]) (Cons 1 [0,0,0,1,1]) {- * Comparisons -} {- | Two polynomials may be stored differently. This function checks whether two values of type @LaurentPolynomial@ actually represent the same polynomial. -} equivalent :: (Eq a, ZeroTestable.C a) => T a -> T a -> Bool equivalent xs ys = let (Cons xt x, Cons yt y) = if expon xs <= expon ys then (xs,ys) else (ys,xs) (xPref, xSuf) = splitAt (yt-xt) x aux (a:as) (b:bs) = a == b && aux as bs aux [] bs = all isZero bs aux as [] = all isZero as in all isZero xPref && aux xSuf y instance (Eq a, ZeroTestable.C a) => Eq (T a) where (==) = equivalent identical :: (Eq a) => T a -> T a -> Bool identical (Cons xt xs) (Cons yt ys) = xt==yt && xs == ys {- | Check whether a Laurent polynomial has only the absolute term, that is, it represents the constant polynomial. -} isAbsolute :: (ZeroTestable.C a) => T a -> Bool isAbsolute (Cons xt x) = and (zipWith (\i xi -> isZero xi || i==0) [xt..] x) {- * Transformations of arguments -} {- | p(z) -> p(-z) -} alternate :: Additive.C a => T a -> T a alternate (Cons xt x) = Cons xt (zipWith id (drop (mod xt 2) (cycle [id,NP.negate])) x) {- | p(z) -> p(1\/z) -} reverse :: T a -> T a reverse (Cons xt x) = Cons (1 - xt - length x) (List.reverse x) {- | p(exp(i·x)) -> conjugate(p(exp(i·x))) If you interpret @(p*)@ as a linear operator on the space of Laurent polynomials, then @(adjoint p *)@ is the adjoint operator. -} adjoint :: Additive.C a => T (Complex.T a) -> T (Complex.T a) adjoint x = let (Cons yt y) = reverse x in (Cons yt (map Complex.conjugate y))