Proof of Nuprl Lemma : face-lattice-le

Step * 1 1 1 1 1 1 of Lemma face-lattice-le

1. T : Type
2. eq : EqDecider(T)
3. x : {ac:fset(fset(T + T))|
        (↑fset-antichain(union-deq(T;T;eq;eq);ac))
        ∧ fset-all(ac;a.fset-contains-none(union-deq(T;T;eq;eq);a;x.face-lattice-constraints(x)))}
4. y : {ac:fset(fset(T + T))|
        (↑fset-antichain(union-deq(T;T;eq;eq);ac))
        ∧ fset-all(ac;a.fset-contains-none(union-deq(T;T;eq;eq);a;x.face-lattice-constraints(x)))}
5. x ≤ y ⇒ fset-ac-le(union-deq(T;T;eq;eq);x;y)
6. x ≤ y ⇐ fset-ac-le(union-deq(T;T;eq;eq);x;y)
7. ∀s:fset(T + T). (s ∈ x ⇒ (↓∃t:fset(T + T). (t ∈ y ∧ t ⊆ s)))
8. x1 : fset(T + T)
9. x1 ∈ x
10. t : fset(T + T)
11. t ∈ y
12. t ⊆ x1
13. {y ∈ y | deq-f-subset(union-deq(T;T;eq;eq)) y x1} = {} ∈ fset(fset(T + T))
14. t ∈ {y ∈ y | deq-f-subset(union-deq(T;T;eq;eq)) y x1}
⊢ False
BY
{ (HypSubst' (-2) (-1) THEN Auto) }

Latex:

Latex:
1. T : Type 2. eq : EqDecider(T) 3. x : \{ac:fset(fset(T + T))| (\muparrow{}fset-antichain(union-deq(T;T;eq;eq);ac)) \mwedge{} fset-all(ac;a.fset-contains-none(union-deq(T;T;eq;eq);a;x.face-lattice-constraints(x)))\} 4. y : \{ac:fset(fset(T + T))| (\muparrow{}fset-antichain(union-deq(T;T;eq;eq);ac)) \mwedge{} fset-all(ac;a.fset-contains-none(union-deq(T;T;eq;eq);a;x.face-lattice-constraints(x)))\} 5. x \mleq{} y {}\mRightarrow{} fset-ac-le(union-deq(T;T;eq;eq);x;y) 6. x \mleq{} y \mLeftarrow{}{} fset-ac-le(union-deq(T;T;eq;eq);x;y) 7. \mforall{}s:fset(T + T). (s \mmember{} x {}\mRightarrow{} (\mdownarrow{}\mexists{}t:fset(T + T). (t \mmember{} y \mwedge{} t \msubseteq{} s))) 8. x1 : fset(T + T) 9. x1 \mmember{} x 10. t : fset(T + T) 11. t \mmember{} y 12. t \msubseteq{} x1 13. \{y \mmember{} y | deq-f-subset(union-deq(T;T;eq;eq)) y x1\} = \{\} 14. t \mmember{} \{y \mmember{} y | deq-f-subset(union-deq(T;T;eq;eq)) y x1\} \mvdash{} False By Latex: (HypSubst' (-2) (-1) THEN Auto) Home Index