I'm just starting playing with idris and theorem proving in general. I can follow most of the examples of proofs of basic facts on the internet, so I wanted to try something arbitrary by my own. So, I want to write a proof term for the following basic property of map:

map : (a -> b) -> List a -> List b
prf : map id = id

Intuitively, I can imagine how the proof should work: Take an arbitrary list l and analyze the possibilities for map id l. When l is empty, it's obvious; when l is non-empty it's based on the concept that function application preserves equality. So, I can do something like this:

prf' : (l : List a) -> map id l = id l

It's like a for all statement. How can I turn it into a proof of the equality of the functions involved?

  • It's possible with Cubical Agda. – ice1000 Mar 6 at 13:13

You can't. Idris's type theory (like Coq's and Agda's) does not support general extensionality. Given two functions f and g that "act the same", you will never be able to prove Not (f = g), but you will only be able to prove f = g if f and g are defined the same, up to alpha and eta equivalence or so. Unfortunately, things only get worse when you consider higher-order functions; there's a theorem about such in the Coq standard library, but I can't seem to find or remember it right now.

Your Answer

By clicking “Post Your Answer”, you agree to our terms of service, privacy policy and cookie policy

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