From: Auke Booij Date: Tue, 24 May 2016 22:01:14 +0000 (+0200) Subject: Implement girard's paradox to show impredicativity of cubicaltt X-Git-Url: https://git.ak3n.com/?a=commitdiff_plain;h=2e4692a0c91da632121ee5964fd4d485e8b75626;p=cubicaltt.git Implement girard's paradox to show impredicativity of cubicaltt --- diff --git a/examples/girard.ctt b/examples/girard.ctt new file mode 100644 index 0000000..d686132 --- /dev/null +++ b/examples/girard.ctt @@ -0,0 +1,45 @@ +module girard where + +{- +Modified from: +http://code.haskell.org/Agda/test/succeed/Hurkens.agda + +There are a number of long lambda expressions in this file. +These are simply derived from the untyped lambda expressions in Hurkens' proof. +But since cubicaltt expects explicit types, we have to insert them. +Luckily cubicaltt can also compute them for us, and we can simply feed cubicaltt its own output. +-} + +bot : U = (A : U) -> A + +neg (A : U) : U = A -> bot + +P (A : U) : U = A -> U + +Set : U = (X : U) -> (P (P X) -> X) -> P (P X) + +tau (t : P (P Set)) : Set = + \(X : U) (f : P (P X) -> X) (p : X -> U) -> + t (\(x : (X0 : U) -> (((X0 -> U) -> U) -> X0) -> ((X0 -> U) -> U)) -> p (f (x X f))) + +sigma (s : Set) : P (P Set) = s Set tau + +Delta : P Set = + \(y : (X : U) -> (((X -> U) -> U) -> X) -> ((X -> U) -> U)) -> + neg ((p : P Set) -> sigma y p -> p (tau (sigma y))) + +Omega : Set = + tau (\(p : ((X : U) -> (((X -> U) -> U) -> X) -> ((X -> U) -> U)) -> U) -> + (x : Set) -> sigma x p -> p x + ) + +D : U = (p : P Set) -> sigma Omega p -> p (tau (sigma Omega)) + +lem1 (p : P Set) (H1 : (x : Set) -> sigma x p -> p x) : p Omega = H1 Omega (\(x : (X : U) -> (((X -> U) -> U) -> X) -> ((X -> U) -> U)) -> H1 (tau (sigma x))) + +lem2 : neg D = lem1 Delta (\(x : (X : U) -> (((X -> U) -> U) -> X) -> ((X -> U) -> U)) (H2 : x ((X : U) -> (((X -> U) -> U) -> X) -> ((X -> U) -> U)) (\(t : (((X : U) -> (((X -> U) -> U) -> X) -> ((X -> U) -> U)) -> U) -> U) -> \(X : U) -> \(f : ((X -> U) -> U) -> X) -> \(p : X -> U) -> t (\(x0 : (X0 : U) -> (((X0 -> U) -> U) -> X0) -> ((X0 -> U) -> U)) -> p (f (x0 X f)))) (\(y : (X : U) -> (((X -> U) -> U) -> X) -> ((X -> U) -> U)) -> ((p : ((X : U) -> (((X -> U) -> U) -> X) -> ((X -> U) -> U)) -> U) -> (y ((X : U) -> (((X -> U) -> U) -> X) -> ((X -> U) -> U)) (\(t : (((X : U) -> (((X -> U) -> U) -> X) -> ((X -> U) -> U)) -> U) -> U) -> \(X : U) -> \(f : ((X -> U) -> U) -> X) -> \(p0 : X -> U) -> t (\(x0 : (X0 : U) -> (((X0 -> U) -> U) -> X0) -> ((X0 -> U) -> U)) -> p0 (f (x0 X f)))) p) -> (p (\(X : U) -> \(f : ((X -> U) -> U) -> X) -> \(p0 : X -> U) -> y ((X0 : U) -> (((X0 -> U) -> U) -> X0) -> ((X0 -> U) -> U)) (\(t : (((X0 : U) -> (((X0 -> U) -> U) -> X0) -> ((X0 -> U) -> U)) -> U) -> U) -> \(X0 : U) -> \(f0 : ((X0 -> U) -> U) -> X0) -> \(p1 : X0 -> U) -> t (\(x0 : (X00 : U) -> (((X00 -> U) -> U) -> X00) -> ((X00 -> U) -> U)) -> p1 (f0 (x0 X0 f0)))) (\(x0 : (X0 : U) -> (((X0 -> U) -> U) -> X0) -> ((X0 -> U) -> U)) -> p0 (f (x0 X f)))))) -> ((A : U) -> A))) (H3 : (p : ((X : U) -> (((X -> U) -> U) -> X) -> ((X -> U) -> U)) -> U) -> (x ((X : U) -> (((X -> U) -> U) -> X) -> ((X -> U) -> U)) (\(t : (((X : U) -> (((X -> U) -> U) -> X) -> ((X -> U) -> U)) -> U) -> U) -> \(X : U) -> \(f : ((X -> U) -> U) -> X) -> \(p0 : X -> U) -> t (\(x0 : (X0 : U) -> (((X0 -> U) -> U) -> X0) -> ((X0 -> U) -> U)) -> p0 (f (x0 X f)))) p) -> (p (\(X : U) -> \(f : ((X -> U) -> U) -> X) -> \(p0 : X -> U) -> x ((X0 : U) -> (((X0 -> U) -> U) -> X0) -> ((X0 -> U) -> U)) (\(t : (((X0 : U) -> (((X0 -> U) -> U) -> X0) -> ((X0 -> U) -> U)) -> U) -> U) -> \(X0 : U) -> \(f0 : ((X0 -> U) -> U) -> X0) -> \(p1 : X0 -> U) -> t (\(x0 : (X00 : U) -> (((X00 -> U) -> U) -> X00) -> ((X00 -> U) -> U)) -> p1 (f0 (x0 X0 f0)))) (\(x0 : (X0 : U) -> (((X0 -> U) -> U) -> X0) -> ((X0 -> U) -> U)) -> p0 (f (x0 X f)))))) -> H3 Delta H2 (\(p : ((X : U) -> (((X -> U) -> U) -> X) -> ((X -> U) -> U)) -> U) -> H3 (\(y : (X : U) -> (((X -> U) -> U) -> X) -> ((X -> U) -> U)) -> p (tau (sigma y))))) + +lem3 : D = \(p : ((X : U) -> (((X -> U) -> U) -> X) -> ((X -> U) -> U)) -> U) -> lem1 (\(y : (X : U) -> (((X -> U) -> U) -> X) -> ((X -> U) -> U)) -> p (tau (sigma y))) + +-- Evaluating "loop" results in a nonterminating computation. +loop : bot = lem2 lem3