# What is implicit recursion?

What is implicit recursion? How is it different from explicit recursion?

-

I've not seen the term used often. A Google search revealed a usage in a book on the lambda calculus. That book is arguing as follows:

1. An equation that claims to be a definition should not include the thing defined on the right-hand side. (I agree with this.)
2. If such an equation, like

``````FAC = \n. if n = 0 then 1 else n * FAC (n-1),
``````

does show up, we'll call it "implicit recursion" and say it's illegal. (I'm a bit dubious about this.)

I don't know why this term is considered useful; to me it's just another piece of terminology. The important thing is to distinguish a true mathematical definition from a recursion equation, which has to be solved. Not every recursion equation has a useful or interesting solution; for example, although the factorial function is a solution for `FAC` above, the only useful solution for

``````x = x + 1
``````

is "bottom", which may stand for "wrong" or "undefined" or "divergence".

I think the line in the textbook is trying to distinguish between "implicit recursion" (which I would call a recursion equation or a recursive equation) and a mathematical definition that uses an explicit fixed-point operator like the Y combinator.

When it comes to practical programming languages, all this discussion is extremely academic. Programming languages are totally set up to support "implicit recursion", although explicit fixed-point combinators are also surprisingly useful.

-
I suspect the original poster made up the term, as the opposite of "explicit recursion" (as in the other answer). –  ShreevatsaR Jun 3 '09 at 1:42