Apologies in advance if this question is a bit vague. It's the result of some weekend daydreaming.
With Haskell's wonderful type system, it's delightfully pleasing to express mathematical (especially algebraic) structure as typeclasses. I mean, just have a look at numeric-prelude! But taking advantage of such wonderful type structure in practice has always seemed difficult to me.
You have a nice, type-system way of expressing that
v2 are elements of a vector space
V and that
w is a an element of a vector space
W. The type system lets you write a program adding
v2, but not
w. Great! But in practice you might want to play with potentially hundreds of vector spaces, and you certainly don't want to create types
V100 and declare them instances of the vector space typeclass! Or maybe you read some data from the real world resulting in symbols
c - you may want to express that the free vector space over these symbols really is a vector space!
So you're stuck, right? In order to do many of the things you'd like to do with vector spaces in a scientific computing setting, you have to give up your typesystem by foregoing a vector space typeclass and having functions do run-time compatibility checks instead. Should you have to? Shouldn't it be possible to use the fact that Haskell is purely functional to write a program that generates all the types you need and inserts them into the real program? Does such a technique exist? By all means do point out if I'm simply overlooking something basic here (I probably am) :-)
Edit: Just now did I discover fundeps. I'll have to think a bit about how they relate to my question (enlightening comments with regards to this are appreciated).