There's a Haskell library for numerical stuff in hackageDB: hmatrix. It draws from LAPACK, BLAS and GSL (GNU Scientific Library).

But you should keep in mind that imperative algorithms can be readily transferred into purely-functional languages using monads (more specifically, state transformers). In fact, any efficient, in-place implementation must generally use such a mechanism to provide mutable variables in purely-functional languages.

As for following a functional style, it isn't possible in many cases. For many problems, there aren't any (efficient) functional approaches known. Of course, you can get such algorithms to work in Haskell for example, but they won't look much different than if they were written in Matlab, Fortran or C.

EDIT:

It's both an *apparent* incompatibility, as well as an issue of which came first:

- Efficient numerical algorithms usually require mutable data. While this is possible in a purely-functional setting, it is not as straightforward as in imperative languages. But the two computational models are perfectly equivalent.
- The underlying machine (e.g. instruction set) has always been and still is imperative, with very few exceptions (!). Imperatively-coded algorithms are easier to analyze and optimize given the way the real machine is modeled.
- While the underlying mathematics allow relatively easy derivations for functional solutions, you won't get an efficient algorithm (just as in the case of deriving imperative solutions directly from mathematics). Since most effort has been and still is directed towards imperative solutions, functional counterparts are simply unknown. By functional counterparts I mean code that properly expresses functional intent and style.
- There's quite a lot of imperative code that can be reused. Much of it can be transcribed into a functional language using state transformers, though it would still look imperative.

I actually think a purely-functional language like Haskell could be beneficial for coding algorithms: one could unify the mathematical description, the algorithm itself and some sort of type-oriented proof (i.e. using the *Curry-Howard isomorphism*) in the same chunk of code.

complexity, as opposed to traditional linear algebra which are really basic operations but involve large quantities of data. Functional languages are good at expressing complicated algorithms clearly, whereas imperative algorithms tend to quickly become unmaintainable as it grows complex. – Rufflewind Dec 27 '14 at 21:18