On May 9, 2015, at 11:33, Donald Stufft firstname.lastname@example.org wrote:
On May 9, 2015, at 2:30 PM, David Mertz email@example.com wrote:
On Sat, May 9, 2015 at 1:16 PM, Steven D'Aprano firstname.lastname@example.org wrote: On Sat, May 09, 2015 at 11:38:38AM -0400, Ron Adam wrote:
How about an operator for partial?
root @ mean @ map $ square(xs)
I have trouble seeing the advantage of a special function composition operator when it is easy to write a general 'compose()' function that can produce such things easily enough.
E.g. in a white paper I just did for O'Reilly on _Functional Programming in Python_ I propose this little example implementation:
def compose(*funcs): "Return a new function s.t. compose(f,g,...)(x) == f(g(...(x)))" def inner(data, funcs=funcs): result = data for f in reversed(funcs): result = f(result) return result return inner
Which we might use as:
RMS = compose(root, mean, square) result = RMS(my_array)
This is trivial to write.
The nontrivial part is thinking through whether you want left or right compose, what you want to do about multiple arguments, etc. So, unless we can solve _that_ problem by showing that there is one and only one obvious answer, we don't gain anything by implementing one of the many trivial-to-implement possibilities in the stdlib.
Maybe as a recipe in the docs, it would be worth showing two different compose functions to demonstrate how easy it is to write whichever one you want (and how important it is to figure out which one you want).