Proof of Nuprl Lemma : fl-all-decomp

Step * 1 1 2 1 1 1 1 1 1 of Lemma fl-all-decomp

1. T : Type
2. eq : EqDecider(T)
3. phi : Point(face-lattice(T;eq))
4. i : T
5. ∀x,y:Point(face-lattice(T;eq)). (x ≤ y ⇒ y ≤ x ⇒ (x = y ∈ Point(face-lattice(T;eq))))
6. Point(face-lattice(T;eq)) ⊆r fset(fset(T + T))
7. s : fset(T + T)
8. s ∈ phi
9. ¬inl i ∈ s
10. a : T + T
11. (inr i ) = a ∈ (T + T)
12. a ∈ s
13. s ∈ phi
14. {a} ∈ {{a}}
⊢ s ∈ if fset-contains-none(union-deq(T;T;eq;eq);s;x.face-lattice-constraints(x)) then {s} else {} fi
BY
{ AutoSplit }

1
1. T : Type
2. eq : EqDecider(T)
3. phi : Point(face-lattice(T;eq))
4. i : T
5. ∀x,y:Point(face-lattice(T;eq)). (x ≤ y ⇒ y ≤ x ⇒ (x = y ∈ Point(face-lattice(T;eq))))
6. Point(face-lattice(T;eq)) ⊆r fset(fset(T + T))
7. s : fset(T + T)
8. ¬↑fset-contains-none(union-deq(T;T;eq;eq);s;x.face-lattice-constraints(x))
9. s ∈ phi
10. ¬inl i ∈ s
11. a : T + T
12. (inr i ) = a ∈ (T + T)
13. a ∈ s
14. s ∈ phi
15. {a} ∈ {{a}}
⊢ False

Latex:

Latex:
1. T : Type 2. eq : EqDecider(T) 3. phi : Point(face-lattice(T;eq)) 4. i : T 5. \mforall{}x,y:Point(face-lattice(T;eq)). (x \mleq{} y {}\mRightarrow{} y \mleq{} x {}\mRightarrow{} (x = y)) 6. Point(face-lattice(T;eq)) \msubseteq{}r fset(fset(T + T)) 7. s : fset(T + T) 8. s \mmember{} phi 9. \mneg{}inl i \mmember{} s 10. a : T + T 11. (inr i ) = a 12. a \mmember{} s 13. s \mmember{} phi 14. \{a\} \mmember{} \{\{a\}\} \mvdash{} s \mmember{} if fset-contains-none(union-deq(T;T;eq;eq);s;x.face-lattice-constraints(x)) then \{s\} else \{\} fi By Latex: AutoSplit Home Index