So I have a list of a functions of two arguments of the type
[a -> a -> a]
I want to write a function which will take the list and compose them into a chain of functions which takes length+1 arguments composed on the left. For example if I have
[f,g,h] all of types
[a -> a -> a] I need to write a function which gives:
chain [f,g,h] = \a b c d -> f ( g ( h a b ) c ) d
Also if it helps, the functions are commutative in their arguments ( i.e.
f x y = f y x for all
x y ).
I can do this inside of a list comprehension given that I know the the number of functions in question, it would be almost exactly like the definition. It's the stretch from a fixed number of functions to a dynamic number that has me stumped.
This is what I have so far:
f xs = f' xs where f'  = id f' (x:xs) = \z -> x (f' xs) z
I think the logic is along the right path, it just doesn't type-check.
Thanks in advance!