Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free, no registration required.

In terms of pithy summaries - this description of Comonads seems to win - describing them as a 'type for input impurity'.

What is an equivalent pithy (one-sentence) description for codata?

share|improve this question

1 Answer 1

up vote 0 down vote accepted

"Codata are types inhabited by values that may be infinite"

This contrasts with "data" which is inhabited only by finite values. For example, if we take the "data" definition of lists, it is inhabited by lists of finite length (as in ML), but if we take the "codata" definition it is inhabited also by infinite length lists (as in Haskell, e.g. x = 1 : x).

Comonads and codata are not necessarily related (although perhaps some might think so due to Kieburtz' paper Comonads and codata in Haskell).

share|improve this answer
    
Would you agree with the statement "In LISP code is data, and LISP code is codata?" –  hawkeye Jul 12 '13 at 0:52
    
No. LISP code is data (it is a list/S-expression), but this is not the same "data" as in "data/codata". I will put an example in the answer to try to make things more clear. –  dorchard Jul 12 '13 at 1:36
    
Ok - just so I'm clear - if I had a function in Clojure that returned a lazy list of the fibconacci series up to infinity - then the result of that function (the lazy list) would be codata, but the function itself would not. –  hawkeye Jul 12 '13 at 2:31
    
As far as I am aware, Clojure doesn't have a static type system (theory) so any description of things as being "codata" will be an informal/operational one. With this in mind then, an infinite list value can be thought of as the value of a codata type. Whilst the function here is finite, am I right in thinking that a Clojure/LISP program could generate an infinite code tree via macros? In which case the "type" of code is also codata, since it contains infinite syntax trees. Please clarify and maybe we can agree on a definition. –  dorchard Jul 12 '13 at 7:34

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.