Proof of Nuprl Lemma : fl-point

Step * 1 1 1 1 of Lemma fl-point

1. T : Type
2. eq : EqDecider(T)
3. x : fset(fset(T + T))
4. ↑fset-antichain(union-deq(T;T;eq;eq);x)
5. ↑fset-antichain(union-deq(T;T;eq;eq);x)
6. a : fset(T + T)
7. a ∈ x
8. z : T
9. ∀x:T + T. (x ∈ a ⇒ (∀c:fset(T + T). (c ∈ face-lattice-constraints(x) ⇒ (¬c ⊆ a))))
10. inl z ∈ T + T
11. inr z ∈ T + T
12. inl z ∈ a
13. inr z ∈ a
⊢ {inl z,inr z } ∈ face-lattice-constraints(inl z)
BY
{ (RepUR ``face-lattice-constraints`` 0 THEN EAuto 1) }

Latex:

Latex:
1. T : Type 2. eq : EqDecider(T) 3. x : fset(fset(T + T)) 4. \muparrow{}fset-antichain(union-deq(T;T;eq;eq);x) 5. \muparrow{}fset-antichain(union-deq(T;T;eq;eq);x) 6. a : fset(T + T) 7. a \mmember{} x 8. z : T 9. \mforall{}x:T + T. (x \mmember{} a {}\mRightarrow{} (\mforall{}c:fset(T + T). (c \mmember{} face-lattice-constraints(x) {}\mRightarrow{} (\mneg{}c \msubseteq{} a)))) 10. inl z \mmember{} T + T 11. inr z \mmember{} T + T 12. inl z \mmember{} a 13. inr z \mmember{} a \mvdash{} \{inl z,inr z \} \mmember{} face-lattice-constraints(inl z) By Latex: (RepUR ``face-lattice-constraints`` 0 THEN EAuto 1) Home Index