How to do automatic differentiation on hmatrix?

Sooooo ... as it turns out going from fake matrices to `hmatrix` datatypes turns out to be nontrivial :)

Preamble for reference:

``````{-# LANGUAGE RankNTypes #-}
{-# LANGUAGE ParallelListComp #-}
{-# LANGUAGE ScopedTypeVariables #-}
{-# LANGUAGE TypeFamilies #-}
{-# LANGUAGE FlexibleContexts #-}

import           Numeric.LinearAlgebra.HMatrix

reconstruct :: (Container Vector a, Num (Vector a))
=> [a] -> [Matrix a] -> Matrix a
reconstruct as φs = sum [ a `scale` φ | a <- as | φ <- φs ]

preserveInfo :: (Container Vector a, Num (Vector a))
=> Matrix a -> [a] -> [Matrix a] -> a
preserveInfo img as φs = sumElements (errImg * errImg)
where errImg = img - (reconstruct as φs)
``````

And the call to the `gradientDescent` function:

``````gradientDescentOverAs :: forall m a. (Floating a, Ord a, Num (Vector a))
=> Matrix a -> [Matrix a] -> [a] -> [[a]]
where go as = preserveInfo img as φs
``````

edit: this is not the code in the original question but boiled down as much as possible. GHC requires some constraints on the `go` sub-function, but the answer proposed in the linked question doesn't apply here.

edit2, quoting myself from below:

I come to believe it can't be done. `Matrix` requires it's elements to be in the `Element` class. The only elements there are `Double`, `Float` and their `Complex` forms. All of these are not accepted by `gradientDescent`.

So basically this is the same question as the one linked above, but for the `hmatrix` datatypes instead of my handrolled ones.

edit3

Relevant, email conversation between Edward Kmett and Dominic Steinitz on the topic: https://mail.haskell.org/pipermail/haskell-cafe/2013-April/107561.html

I found this series of blog posts to be very helpful: https://idontgetoutmuch.wordpress.com/2014/09/09/fun-with-extended-kalman-filters-4/ (both HMatrix with static size guarantees and the `jacobian` function from AD are demonstrated).
• perhaps you could boil down the smallest (non-)working example from the above, get rid of the greek letters and give the functions some more expressive names? Also, what about getting rid of the signature for `go` in the definition of adEq5H ? and, why do you have two definitions for eqsH ? – ocramz May 7 '15 at 9:44
• I come to believe it can't be done. `Matrix` requires it's elements to be in the `Element` class. The only elements there are `Double`, `Float` and their `Complex` forms. All of these are not accepted by `gradientDescent`. – fho May 7 '15 at 10:33