Proof of Nuprl Lemma : FOL-sequent-evidence-false-hyp

Step * 1 3 1 2 1 1 of Lemma FOL-sequent-evidence-false-hyp

1. hyps : mFOL() List
2. concl : mFOL()
3. i : ℕ||hyps||
4. ↑mFOatomic?(hyps[i])
5. mFOatomic-name(hyps[i]) = "false" ∈ Atom
6. mFOatomic-vars(hyps[i]) = [] ∈ (ℤ List)
7. Dom : Type
8. S : FOStruct+{i:l}(Dom)
9. a : FOAssignment(mFOL-sequent-freevars(<hyps, concl>),Dom)
10. x : tuple-type(FOL-hyps-meaning(Dom;S;a;hyps))
11. x.i = x.i ∈ FOL-hyps-meaning(Dom;S;a;hyps)[i]
12. hyps[i] = false ∈ mFOL()
⊢ ((S "false" []) ⋃ (S "false" [])) ⊆r (S "false" [])
BY
{ (GenConclTerm ⌜S "false" []⌝⋅ THEN Auto) }

1
1. hyps : mFOL() List
2. concl : mFOL()
3. i : ℕ||hyps||
4. ↑mFOatomic?(hyps[i])
5. mFOatomic-name(hyps[i]) = "false" ∈ Atom
6. mFOatomic-vars(hyps[i]) = [] ∈ (ℤ List)
7. Dom : Type
8. S : FOStruct+{i:l}(Dom)
9. a : FOAssignment(mFOL-sequent-freevars(<hyps, concl>),Dom)
10. x : tuple-type(FOL-hyps-meaning(Dom;S;a;hyps))
11. x.i = x.i ∈ FOL-hyps-meaning(Dom;S;a;hyps)[i]
12. hyps[i] = false ∈ mFOL()
13. v : ℙ
14. (S "false" []) = v ∈ ℙ
⊢ (v ⋃ v) ⊆r v

Latex:

Latex:
1. hyps : mFOL() List 2. concl : mFOL() 3. i : \mBbbN{}||hyps|| 4. \muparrow{}mFOatomic?(hyps[i]) 5. mFOatomic-name(hyps[i]) = "false" 6. mFOatomic-vars(hyps[i]) = [] 7. Dom : Type 8. S : FOStruct+\{i:l\}(Dom) 9. a : FOAssignment(mFOL-sequent-freevars(<hyps, concl>),Dom) 10. x : tuple-type(FOL-hyps-meaning(Dom;S;a;hyps)) 11. x.i = x.i 12. hyps[i] = false \mvdash{} ((S "false" []) \mcup{} (S "false" [])) \msubseteq{}r (S "false" []) By Latex: (GenConclTerm \mkleeneopen{}S "false" []\mkleeneclose{}\mcdot{} THEN Auto) Home Index