Copyright	(c) Edward Kmett 2010-2015
License	BSD3
Maintainer	ekmett@gmail.com
Stability	experimental
Portability	GHC only
Safe Haskell	None
Language	Haskell2010

Numeric.AD.Internal.Kahn

Description

This module provides reverse-mode Automatic Differentiation implementation using linear time topological sorting after the fact.

For this form of reverse-mode AD we use StableName to recover sharing information from the tape to avoid combinatorial explosion, and thus run asymptotically faster than it could without such sharing information, but the use of side-effects contained herein is benign.

Synopsis

newtype Kahn a = Kahn (Tape a (Kahn a))
data Tape a t
- = Zero
- | Lift !a
- | Var !a !Int
- | Binary !a a a t t
- | Unary !a a t
partials :: forall a. Num a => Kahn a -> [(Int, a)]
partialArray :: Num a => (Int, Int) -> Kahn a -> Array Int a
partialMap :: Num a => Kahn a -> IntMap a
derivative :: Num a => Kahn a -> a
derivative' :: Num a => Kahn a -> (a, a)
vgrad :: Grad i o o' a => i -> o
vgrad' :: Grad i o o' a => i -> o'
class Num a => Grad i o o' a | i -> a o o', o -> a i o', o' -> a i o where
- pack :: i -> [Kahn a] -> Kahn a
- unpack :: ([a] -> [a]) -> o
- unpack' :: ([a] -> (a, [a])) -> o'
bind :: Traversable f => f a -> (f (Kahn a), (Int, Int))
unbind :: Functor f => f (Kahn a) -> Array Int a -> f a
unbindMap :: (Functor f, Num a) => f (Kahn a) -> IntMap a -> f a
unbindWith :: (Functor f, Num a) => (a -> b -> c) -> f (Kahn a) -> Array Int b -> f c
unbindMapWithDefault :: (Functor f, Num a) => b -> (a -> b -> c) -> f (Kahn a) -> IntMap b -> f c
primal :: Num a => Kahn a -> a
var :: a -> Int -> Kahn a
varId :: Kahn a -> Int

Documentation

newtype Kahn a Source #

Kahn is a Mode using reverse-mode automatic differentiation that provides fast diffFU, diff2FU, grad, grad2 and a fast jacobian when you have a significantly smaller number of outputs than inputs.

Constructors

Kahn (Tape a (Kahn a))

Instances

(Num a, Bounded a) => Bounded (Kahn a) Source #
Instance details Defined in Numeric.AD.Internal.Kahn Methods minBound :: Kahn a # maxBound :: Kahn a #
(Num a, Enum a) => Enum (Kahn a) Source #
Instance details Defined in Numeric.AD.Internal.Kahn Methods succ :: Kahn a -> Kahn a # pred :: Kahn a -> Kahn a # toEnum :: Int -> Kahn a # fromEnum :: Kahn a -> Int # enumFrom :: Kahn a -> [Kahn a] # enumFromThen :: Kahn a -> Kahn a -> [Kahn a] # enumFromTo :: Kahn a -> Kahn a -> [Kahn a] # enumFromThenTo :: Kahn a -> Kahn a -> Kahn a -> [Kahn a] #
(Num a, Eq a) => Eq (Kahn a) Source #
Instance details Defined in Numeric.AD.Internal.Kahn Methods (==) :: Kahn a -> Kahn a -> Bool # (/=) :: Kahn a -> Kahn a -> Bool #
Floating a => Floating (Kahn a) Source #
Instance details Defined in Numeric.AD.Internal.Kahn Methods pi :: Kahn a # exp :: Kahn a -> Kahn a # log :: Kahn a -> Kahn a # sqrt :: Kahn a -> Kahn a # (**) :: Kahn a -> Kahn a -> Kahn a # logBase :: Kahn a -> Kahn a -> Kahn a # sin :: Kahn a -> Kahn a # cos :: Kahn a -> Kahn a # tan :: Kahn a -> Kahn a # asin :: Kahn a -> Kahn a # acos :: Kahn a -> Kahn a # atan :: Kahn a -> Kahn a # sinh :: Kahn a -> Kahn a # cosh :: Kahn a -> Kahn a # tanh :: Kahn a -> Kahn a # asinh :: Kahn a -> Kahn a # acosh :: Kahn a -> Kahn a # atanh :: Kahn a -> Kahn a # log1p :: Kahn a -> Kahn a # expm1 :: Kahn a -> Kahn a # log1pexp :: Kahn a -> Kahn a # log1mexp :: Kahn a -> Kahn a #
Fractional a => Fractional (Kahn a) Source #
Instance details Defined in Numeric.AD.Internal.Kahn Methods (/) :: Kahn a -> Kahn a -> Kahn a # recip :: Kahn a -> Kahn a # fromRational :: Rational -> Kahn a #
Num a => Num (Kahn a) Source #
Instance details Defined in Numeric.AD.Internal.Kahn Methods (+) :: Kahn a -> Kahn a -> Kahn a # (-) :: Kahn a -> Kahn a -> Kahn a # (*) :: Kahn a -> Kahn a -> Kahn a # negate :: Kahn a -> Kahn a # abs :: Kahn a -> Kahn a # signum :: Kahn a -> Kahn a # fromInteger :: Integer -> Kahn a #
(Num a, Ord a) => Ord (Kahn a) Source #
Instance details Defined in Numeric.AD.Internal.Kahn Methods compare :: Kahn a -> Kahn a -> Ordering # (<) :: Kahn a -> Kahn a -> Bool # (<=) :: Kahn a -> Kahn a -> Bool # (>) :: Kahn a -> Kahn a -> Bool # (>=) :: Kahn a -> Kahn a -> Bool # max :: Kahn a -> Kahn a -> Kahn a # min :: Kahn a -> Kahn a -> Kahn a #
Real a => Real (Kahn a) Source #
Instance details Defined in Numeric.AD.Internal.Kahn Methods toRational :: Kahn a -> Rational #
RealFloat a => RealFloat (Kahn a) Source #
Instance details Defined in Numeric.AD.Internal.Kahn Methods floatRadix :: Kahn a -> Integer # floatDigits :: Kahn a -> Int # floatRange :: Kahn a -> (Int, Int) # decodeFloat :: Kahn a -> (Integer, Int) # encodeFloat :: Integer -> Int -> Kahn a # exponent :: Kahn a -> Int # significand :: Kahn a -> Kahn a # scaleFloat :: Int -> Kahn a -> Kahn a # isNaN :: Kahn a -> Bool # isInfinite :: Kahn a -> Bool # isDenormalized :: Kahn a -> Bool # isNegativeZero :: Kahn a -> Bool # isIEEE :: Kahn a -> Bool # atan2 :: Kahn a -> Kahn a -> Kahn a #
RealFrac a => RealFrac (Kahn a) Source #
Instance details Defined in Numeric.AD.Internal.Kahn Methods properFraction :: Integral b => Kahn a -> (b, Kahn a) # truncate :: Integral b => Kahn a -> b # round :: Integral b => Kahn a -> b # ceiling :: Integral b => Kahn a -> b # floor :: Integral b => Kahn a -> b #
Show a => Show (Kahn a) Source #
Instance details Defined in Numeric.AD.Internal.Kahn Methods showsPrec :: Int -> Kahn a -> ShowS # show :: Kahn a -> String # showList :: [Kahn a] -> ShowS #
MuRef (Kahn a) Source #
Instance details Defined in Numeric.AD.Internal.Kahn Associated Types type DeRef (Kahn a) :: Type -> Type # Methods mapDeRef :: Applicative f => (forall b. (MuRef b, DeRef (Kahn a) ~ DeRef b) => b -> f u) -> Kahn a -> f (DeRef (Kahn a) u) #
Erf a => Erf (Kahn a) Source #
Instance details Defined in Numeric.AD.Internal.Kahn Methods erf :: Kahn a -> Kahn a # erfc :: Kahn a -> Kahn a # erfcx :: Kahn a -> Kahn a # normcdf :: Kahn a -> Kahn a #
InvErf a => InvErf (Kahn a) Source #
Instance details Defined in Numeric.AD.Internal.Kahn Methods inverf :: Kahn a -> Kahn a # inverfc :: Kahn a -> Kahn a # invnormcdf :: Kahn a -> Kahn a #
Num a => Mode (Kahn a) Source #
Instance details Defined in Numeric.AD.Internal.Kahn Associated Types type Scalar (Kahn a) :: Type Source # Methods isKnownConstant :: Kahn a -> Bool Source # isKnownZero :: Kahn a -> Bool Source # auto :: Scalar (Kahn a) -> Kahn a Source # (^) :: Scalar (Kahn a) -> Kahn a -> Kahn a Source # (^) :: Kahn a -> Scalar (Kahn a) -> Kahn a Source # (^/) :: Kahn a -> Scalar (Kahn a) -> Kahn a Source # zero :: Kahn a Source #
Num a => Jacobian (Kahn a) Source #
Instance details Defined in Numeric.AD.Internal.Kahn Associated Types type D (Kahn a) :: Type Source # Methods unary :: (Scalar (Kahn a) -> Scalar (Kahn a)) -> D (Kahn a) -> Kahn a -> Kahn a Source # lift1 :: (Scalar (Kahn a) -> Scalar (Kahn a)) -> (D (Kahn a) -> D (Kahn a)) -> Kahn a -> Kahn a Source # lift1_ :: (Scalar (Kahn a) -> Scalar (Kahn a)) -> (D (Kahn a) -> D (Kahn a) -> D (Kahn a)) -> Kahn a -> Kahn a Source # binary :: (Scalar (Kahn a) -> Scalar (Kahn a) -> Scalar (Kahn a)) -> D (Kahn a) -> D (Kahn a) -> Kahn a -> Kahn a -> Kahn a Source # lift2 :: (Scalar (Kahn a) -> Scalar (Kahn a) -> Scalar (Kahn a)) -> (D (Kahn a) -> D (Kahn a) -> (D (Kahn a), D (Kahn a))) -> Kahn a -> Kahn a -> Kahn a Source # lift2_ :: (Scalar (Kahn a) -> Scalar (Kahn a) -> Scalar (Kahn a)) -> (D (Kahn a) -> D (Kahn a) -> D (Kahn a) -> (D (Kahn a), D (Kahn a))) -> Kahn a -> Kahn a -> Kahn a Source #
Num a => Grad (Kahn a) [a] (a, [a]) a Source #
Instance details Defined in Numeric.AD.Internal.Kahn Methods pack :: Kahn a -> [Kahn a] -> Kahn a Source # unpack :: ([a] -> [a]) -> [a] Source # unpack' :: ([a] -> (a, [a])) -> (a, [a]) Source #
Grad i o o' a => Grad (Kahn a -> i) (a -> o) (a -> o') a Source #
Instance details Defined in Numeric.AD.Internal.Kahn Methods pack :: (Kahn a -> i) -> [Kahn a] -> Kahn a Source # unpack :: ([a] -> [a]) -> a -> o Source # unpack' :: ([a] -> (a, [a])) -> a -> o' Source #
type DeRef (Kahn a) Source #
Instance details Defined in Numeric.AD.Internal.Kahn type DeRef (Kahn a) = Tape a
type Scalar (Kahn a) Source #
Instance details Defined in Numeric.AD.Internal.Kahn type Scalar (Kahn a) = a
type D (Kahn a) Source #
Instance details Defined in Numeric.AD.Internal.Kahn type D (Kahn a) = Id a

data Tape a t Source #

A Tape records the information needed back propagate from the output to each input during reverse Mode AD.

Constructors

Zero
Lift !a
Var !a !Int
Binary !a a a t t
Unary !a a t

Instances

(Data a, Data t) => Data (Tape a t) Source #
Instance details Defined in Numeric.AD.Internal.Kahn Methods gfoldl :: (forall d b. Data d => c (d -> b) -> d -> c b) -> (forall g. g -> c g) -> Tape a t -> c (Tape a t) # gunfold :: (forall b r. Data b => c (b -> r) -> c r) -> (forall r. r -> c r) -> Constr -> c (Tape a t) # toConstr :: Tape a t -> Constr # dataTypeOf :: Tape a t -> DataType # dataCast1 :: Typeable t0 => (forall d. Data d => c (t0 d)) -> Maybe (c (Tape a t)) # dataCast2 :: Typeable t0 => (forall d e. (Data d, Data e) => c (t0 d e)) -> Maybe (c (Tape a t)) # gmapT :: (forall b. Data b => b -> b) -> Tape a t -> Tape a t # gmapQl :: (r -> r' -> r) -> r -> (forall d. Data d => d -> r') -> Tape a t -> r # gmapQr :: (r' -> r -> r) -> r -> (forall d. Data d => d -> r') -> Tape a t -> r # gmapQ :: (forall d. Data d => d -> u) -> Tape a t -> [u] # gmapQi :: Int -> (forall d. Data d => d -> u) -> Tape a t -> u # gmapM :: Monad m => (forall d. Data d => d -> m d) -> Tape a t -> m (Tape a t) # gmapMp :: MonadPlus m => (forall d. Data d => d -> m d) -> Tape a t -> m (Tape a t) # gmapMo :: MonadPlus m => (forall d. Data d => d -> m d) -> Tape a t -> m (Tape a t) #
(Show a, Show t) => Show (Tape a t) Source #
Instance details Defined in Numeric.AD.Internal.Kahn Methods showsPrec :: Int -> Tape a t -> ShowS # show :: Tape a t -> String # showList :: [Tape a t] -> ShowS #

partials :: forall a. Num a => Kahn a -> [(Int, a)] Source #

This returns a list of contributions to the partials. The variable ids returned in the list are likely not unique!

partialArray :: Num a => (Int, Int) -> Kahn a -> Array Int a Source #

Return an Array of partials given bounds for the variable IDs.

partialMap :: Num a => Kahn a -> IntMap a Source #

Return an IntMap of sparse partials

derivative :: Num a => Kahn a -> a Source #

derivative' :: Num a => Kahn a -> (a, a) Source #

vgrad :: Grad i o o' a => i -> o Source #

vgrad' :: Grad i o o' a => i -> o' Source #

class Num a => Grad i o o' a | i -> a o o', o -> a i o', o' -> a i o where Source #

Methods

pack :: i -> [Kahn a] -> Kahn a Source #

unpack :: ([a] -> [a]) -> o Source #

unpack' :: ([a] -> (a, [a])) -> o' Source #

Instances

Num a => Grad (Kahn a) [a] (a, [a]) a Source #
Instance details Defined in Numeric.AD.Internal.Kahn Methods pack :: Kahn a -> [Kahn a] -> Kahn a Source # unpack :: ([a] -> [a]) -> [a] Source # unpack' :: ([a] -> (a, [a])) -> (a, [a]) Source #
Grad i o o' a => Grad (Kahn a -> i) (a -> o) (a -> o') a Source #
Instance details Defined in Numeric.AD.Internal.Kahn Methods pack :: (Kahn a -> i) -> [Kahn a] -> Kahn a Source # unpack :: ([a] -> [a]) -> a -> o Source # unpack' :: ([a] -> (a, [a])) -> a -> o' Source #

bind :: Traversable f => f a -> (f (Kahn a), (Int, Int)) Source #

unbind :: Functor f => f (Kahn a) -> Array Int a -> f a Source #

unbindMap :: (Functor f, Num a) => f (Kahn a) -> IntMap a -> f a Source #

unbindWith :: (Functor f, Num a) => (a -> b -> c) -> f (Kahn a) -> Array Int b -> f c Source #

unbindMapWithDefault :: (Functor f, Num a) => b -> (a -> b -> c) -> f (Kahn a) -> IntMap b -> f c Source #

primal :: Num a => Kahn a -> a Source #

var :: a -> Int -> Kahn a Source #

varId :: Kahn a -> Int Source #