# Is there a name for this partial-application--like functional programming technique?

I have a function `f: (a, b, c = 5, d = 0) -> {...}` that takes between 2 and 4 arguments.

I want to pass a "bound" version of this function that always uses the defaults for the last arguments, but uses specific values (say 1 and 2) for the first two arguments. That is, I want `g: () -> f(1, 2)`.

If I were to do partial application, I would get `g': (c = 5, d = 0) -> f(1, 2, c, d)`. That is, partial application wouldn't enforce the zero-argument nature of `g` that I desire, instead giving me `g'` which takes between 0 and 2 arguments.

What is the technique for getting `g` from `f` called, if anything?

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`f` already has the default arguments, so why wouldn't currying `g: () -> f(1, 2)` work for you? –  Matt Ball Jun 2 '11 at 16:28
I do not understand how this question is related to currying. The problem you are describing does not seem to be related to making a function take one argument and return another function, which is what currying is. –  murgatroid99 Jun 2 '11 at 16:39
As @murgatroid99 pointed out, this has nothing to do with currying... I think you mean "partial application", which is something a lot of people confuse with currying. I know of no particular name for the technique you're describing. –  pelotom Jun 2 '11 at 16:52
@murgatroid99, @pelotom: You guys are right, I was talking about partial application, not currying. How embarassing -_-. –  Domenic Jun 2 '11 at 16:59
@Matt Ball I don't understand what you mean. I want `g` to take 0 arguments, instead of between 0 and 2. –  Domenic Jun 2 '11 at 17:00

Posting my comment as an answer: it seems that this question has little to do with functional programming or currying or partial application, but is instead precisely about taking a function that takes optional arguments that have defaults, and making a new function with no optional arguments in which the default arguments have been fixed.

Call this conceptual transformation `T`. Assuming for some reason that partial application means that optional arguments remain optional (which need not be universal, but then again, the familiar functional programming languages — Haskell etc. — don't even have optional arguments), there are at least two ways to get `g` from `f`.

• Take `f: (a, b, c = 5, d = 0) -> {....}` which takes 2 to 4 arguments.
• Generate the new function `T(f) : (a,b) -> {...}` which takes exactly 2 arguments. That is, `T(f)(a,b) = f(a,b) = f(a,b,5,0)`.
• Now do partial application on T(f) fixing its two arguments as 1 and 2, and call the resulting function `g`. That is, `g() = T(f)(1,2) = f(1,2) = f(1,2,5,0)`.

• Take `f: (a, b, c = 5, d = 0) -> {....}` which takes 2 to 4 arguments.
• Do partial application on `f` fixing its first two arguments as 1 and 2, and call the resulting function `g'`. That is, `g' : (c=5, d=0) -> f(1, 2, c, d)`. It takes between 0 and 2 arguments.
• Generate the new function `T(g) : () -> {....}` which takes exactly 0 arguments. That is, `T(g)() = g'() = g'(5, 0) = f(1, 2, 5, 0)`.

In any case, the quandary in the question seems to hinge on `T`, rather than any aspect of functional programming or currying or partial application. I don't know if `T` has enough of a point to have a standard name, but something like "fixing/binding default arguments" should be fine.

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