Proof of Nuprl Lemma : transitive-closure-symmetric

Step * 1 of Lemma transitive-closure-symmetric

1. [A] : Type
2. [R] : A ⟶ A ⟶ ℙ
3. s : ∀a,b:A. ((R a b) ⇒ (R b a))
4. a : A
5. b : A
6. L : {L:(a:A × b:A × (R a b)) List| rel_path(A;L;a;b) ∧ 0 < ||L||}
⊢ {L:(a:A × b:A × (R a b)) List| rel_path(A;L;b;a) ∧ 0 < ||L||}
BY

{ (D -1 THEN (Assert λt.let a,b,r = t in <b, a, s a b r> ∈ (a:A × b:A × (R a b)) ⟶ (a:A × b:A × (R a b)) BY Auto)) }

1
1. [A] : Type
2. [R] : A ⟶ A ⟶ ℙ
3. s : ∀a,b:A. ((R a b) ⇒ (R b a))
4. a : A
5. b : A
6. L : (a:A × b:A × (R a b)) List
7. [%1] : rel_path(A;L;a;b) ∧ 0 < ||L||
8. λt.let a,b,r = t in
<b, a, s a b r> ∈ (a:A × b:A × (R a b)) ⟶ (a:A × b:A × (R a b))
⊢ {L:(a:A × b:A × (R a b)) List| rel_path(A;L;b;a) ∧ 0 < ||L||}

Latex:

Latex:
1. [A] : Type 2. [R] : A {}\mrightarrow{} A {}\mrightarrow{} \mBbbP{} 3. s : \mforall{}a,b:A. ((R a b) {}\mRightarrow{} (R b a)) 4. a : A 5. b : A 6. L : \{L:(a:A \mtimes{} b:A \mtimes{} (R a b)) List| rel\_path(A;L;a;b) \mwedge{} 0 < ||L||\} \mvdash{} \{L:(a:A \mtimes{} b:A \mtimes{} (R a b)) List| rel\_path(A;L;b;a) \mwedge{} 0 < ||L||\} By Latex: (D -1 THEN (Assert \mlambda{}t.let a,b,r = t in <b, a, s a b r> \mmember{} (a:A \mtimes{} b:A \mtimes{} (R a b)) {}\mrightarrow{} (a:A \mtimes{} b:A \mtimes{} (R a \000Cb)) BY Auto)) Home Index