# What is “Total Functional Programming”?

Wikipedia has this to say:

Total functional programming (also known as strong functional programming, to be contrasted with ordinary, or weak functional programming) is a programming paradigm which restricts the range of programs to those which are provably terminating.

and

These restrictions mean that total functional programming is not Turing-complete. However, the set of algorithms which can be used is still huge. For example, any algorithm which has had an asymptotic upper bound calculated for it can be trivially transformed into a provably-terminating function by using the upper bound as an extra argument which is decremented upon each iteration or recursion.

There is also a Lambda The Ultimate Post about a paper on Total Functional Programming.

I hadn't come across that until last week on a mailing list.

Are there any more resources, references or any example implementations that you know of?

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I think that at this point is just an idea with no implementation. I'd love to be proved wrong though. Sorry, didn't check LtU's post before writing the answer I deleted. –  Vinko Vrsalovic Sep 28 '08 at 5:47
Hah, I'd never thought about that trivial transformation. That's pretty awesome. –  Joseph Garvin Jul 31 '10 at 21:27
@VinkoVrsalovic this is implemented in Coq currently (and was in '08, afaik). Now, whether Coq is used or not is a different story ;-) –  Kristopher Micinski Jun 4 '12 at 18:59

If I understood that correctly, Total Functional Programming means just that: Programming with Total Functions. If I remember my math courses correctly, a Total Function is a function which is defined over its entire domain, a Partial Function is one which has "holes" in its definition.

Now, if you have a function which for some input value `v` goes into an infinite recursion or an infinite loop or in general doesn't terminate in some other fashion, then your function isn't defined for `v`, and thus partial, i.e. not total.

Total Functional Programming doesn't allow you to write such a function. All functions always return a result for all possible inputs; and the type checker ensures that this is the case.

My guess is that this vastly simplifies error handling: there aren't any.

The downside is already mentioned in your quote: it's not Turing-complete. E.g. an Operating System is essentially a giant infinite loop. Indeed, we do not want an Operating System to terminate, we call this behaviour a "crash" and yell at our computers about it!

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the big thing this doesn't allow is unbounded minimalization. I know sometimes these styles also allow programs that provably never terminate, as those also can be useful(e.g. operating systems). The functions that are tough to deal with are those that might terminate, as you can't know if your program is going to give you the answer(or halt). –  Lewisc Sep 21 '10 at 18:01
I disagree, if you read the paper and post, you can have a total function that "runs forever," it's simply a coinductively defined function, not an inductively defined function, this is exactly how you'd write an operating system using this method of programming. –  Kristopher Micinski Jun 4 '12 at 2:48

Charity is another language that guarantees termination:
http://pll.cpsc.ucalgary.ca/charity1/www/home.html

Hume is a language with 4 levels. The outer level is Turing complete and the innermost layer guarantees termination:
http://www-fp.cs.st-andrews.ac.uk/hume/report/

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No lie, `Hume` sounds cool. –  Shurane Jun 21 '12 at 14:51