Stack Overflow is a community of 4.7 million programmers, just like you, helping each other.

Join them; it only takes a minute:

Sign up
Join the Stack Overflow community to:
  1. Ask programming questions
  2. Answer and help your peers
  3. Get recognized for your expertise

I'm trying to reconcile the definition of referential transparency with how OCaml handles polymorphic types and side-effects. I read on http://www.csc.villanova.edu/~dmatusze/resources/ocaml/ocaml.html that

A definition is said to have referential transparency if its meaning does not depend on the context it is in. Functions in OCaml have referential transparency, that is, changing the context (other variables and other functions) does not change the meaning of any functions you have already defined. This fact can be crucial when you are debugging a program, because you are likely to be redefining functions fairly frequently.

But the way I understand things, this can't be true in OCaml because it is possible to perform a whole bunch of side-effects (like writing to files and performing other calculations) before returning whatever was fed into the function.

You could potentially have a function f : string -> string so that f "a" does not equal f "a". We can drop in some side-effecting expressions into the body of the function that are completely invisible in the type description of f.

As an example f could be defined to return the first line of some file. There could be a function somewhere in the context of f that is changed which affects what first line f returns. Or worse, some function in the context could delete the file that f depends on which would make f undefined.

So is OCaml referentially transparent or am I missing something?

share|improve this question
    
Are you asking about OCaml or these functions? The functions you describe here are not referentially transparent as they are clearly not side-effect free. – Jeff Mercado May 22 '11 at 23:52
1  
I'm asking about OCaml and I don't think side-effects are related to referential transparency. A memoized version of a pure function will often use a hash map to store previously computed values but the function itself will still be referentially transparent even though modifying a hash map is considered a side-effect. – davidk01 May 23 '11 at 0:56
up vote 6 down vote accepted

Ocaml isn't referentially transparent, exactly as you have explained.

Maybe Matuszek wants to emphasize the functional aspects of Ocaml, but in my opinion he is misleading or flat out wrong.

Section Expressions (but not statements) for example says that OCaml is a purely functional language and OCaml claims to be stateless. Section Omissions says

Loops, also, have been omitted, but they are not terribly useful in a purely functional language, anyway.

which is funny since loops wouldn't have been added to Ocaml if they weren't useful.

share|improve this answer

Referential transparency means the context of the function doesn't affect the result, while a "pure" function is a function that depends only on its arguments and has no side-effects. For example in

# let y = 10;;
# let f x = (Printf.printf "%d+%d=%d\n" x y (x+y); x+y);;
val f : int -> int = <fun>
# f 5;;
5+10=15
- : int = 15
# let y = 3;;
val y : int = 3
# f 5;;
5+10=15
- : int = 15

we see that f is referentially transparent (because it doesn't change when you redefine y) but impure.

share|improve this answer

Your Answer

 
discard

By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.