Proof of Nuprl Lemma : Game-add

Step * 1 1 of Lemma Game-add_functionality

1. G1 : Game
2. ∀m:Game
     ((left-option{i:l}(G1;m) ∨ right-option{i:l}(G1;m)) ⇒ (∀H1,G2,H2:Game.  (m ≡ G2 ⇒ H1 ≡ H2 ⇒ m ⊕ H1 ≡ G2 ⊕ H2)))
3. H1 : Game
4. ∀m:Game
     ((left-option{i:l}(H1;m) ∨ right-option{i:l}(H1;m)) ⇒ (∀G2,H2:Game.  (G1 ≡ G2 ⇒ m ≡ H2 ⇒ G1 ⊕ m ≡ G2 ⊕ H2)))
5. G2 : Game
6. ∀m:Game. ((left-option{i:l}(G2;m) ∨ right-option{i:l}(G2;m)) ⇒ (∀H2:Game. (G1 ≡ m ⇒ H1 ≡ H2 ⇒ G1 ⊕ H1 ≡ m ⊕ H2)))
7. H2 : Game
8. ∀m:Game. ((left-option{i:l}(H2;m) ∨ right-option{i:l}(H2;m)) ⇒ G1 ≡ G2 ⇒ H1 ≡ m ⇒ G1 ⊕ H1 ≡ G2 ⊕ m)
9. G1 ≡ G2
10. H1 ≡ H2
11. x : left-indices(G1)
12. j : left-indices(G2)
13. left-move(G1;x) ≡ left-move(G2;j)
⊢ ∃j:left-indices(G2 ⊕ H2). left-move(G1 ⊕ H1;inl x) ≡ left-move(G2 ⊕ H2;j)
BY
{ ((D 0 With ⌜inl j⌝  THENA Auto)
   THEN Reduce 0
   THEN BackThruSomeHyp
   THEN Auto
   THEN RepUR ``left-option right-option`` 0
   THEN Auto) }

Latex:

Latex:
1. G1 : Game 2. \mforall{}m:Game ((left-option\{i:l\}(G1;m) \mvee{} right-option\{i:l\}(G1;m)) {}\mRightarrow{} (\mforall{}H1,G2,H2:Game. (m \mequiv{} G2 {}\mRightarrow{} H1 \mequiv{} H2 {}\mRightarrow{} m \moplus{} H1 \mequiv{} G2 \moplus{} H2))) 3. H1 : Game 4. \mforall{}m:Game ((left-option\{i:l\}(H1;m) \mvee{} right-option\{i:l\}(H1;m)) {}\mRightarrow{} (\mforall{}G2,H2:Game. (G1 \mequiv{} G2 {}\mRightarrow{} m \mequiv{} H2 {}\mRightarrow{} G1 \moplus{} m \mequiv{} G2 \moplus{} H2))) 5. G2 : Game 6. \mforall{}m:Game ((left-option\{i:l\}(G2;m) \mvee{} right-option\{i:l\}(G2;m)) {}\mRightarrow{} (\mforall{}H2:Game. (G1 \mequiv{} m {}\mRightarrow{} H1 \mequiv{} H2 {}\mRightarrow{} G1 \moplus{} H1 \mequiv{} m \moplus{} H2))) 7. H2 : Game 8. \mforall{}m:Game ((left-option\{i:l\}(H2;m) \mvee{} right-option\{i:l\}(H2;m)) {}\mRightarrow{} G1 \mequiv{} G2 {}\mRightarrow{} H1 \mequiv{} m {}\mRightarrow{} G1 \moplus{} H1 \mequiv{} G2 \moplus{} m) 9. G1 \mequiv{} G2 10. H1 \mequiv{} H2 11. x : left-indices(G1) 12. j : left-indices(G2) 13. left-move(G1;x) \mequiv{} left-move(G2;j) \mvdash{} \mexists{}j:left-indices(G2 \moplus{} H2). left-move(G1 \moplus{} H1;inl x) \mequiv{} left-move(G2 \moplus{} H2;j) By Latex: ((D 0 With \mkleeneopen{}inl j\mkleeneclose{} THENA Auto) THEN Reduce 0 THEN BackThruSomeHyp THEN Auto THEN RepUR ``left-option right-option`` 0 THEN Auto) Home Index