Proof of Nuprl Lemma : fset-ac-le-distributive

Step * 3 1 1 1 1 2 of Lemma fset-ac-le-distributive

1. T : Type
2. eq : EqDecider(T)
3. a : {ac:fset(fset(T))| ↑fset-antichain(eq;ac)}
4. b : {ac:fset(fset(T))| ↑fset-antichain(eq;ac)}
5. c : {ac:fset(fset(T))| ↑fset-antichain(eq;ac)}
6. fset-ac-le(eq;fset-ac-glb(eq;a;c);fset-ac-glb(eq;a;fset-ac-lub(eq;b;c)))
7. x : {ac:fset(fset(T))| ↑fset-antichain(eq;ac)}
8. ∀a1:fset(T). (a1 ∈ fset-ac-glb(eq;a;b) ⇒ (¬({y ∈ x | deq-f-subset(eq) y a1} = {} ∈ fset(fset(T)))))
9. ∀a1:fset(T). (a1 ∈ fset-ac-glb(eq;a;c) ⇒ (¬({y ∈ x | deq-f-subset(eq) y a1} = {} ∈ fset(fset(T)))))
10. xx : fset(T)
11. as : fset(T)
12. as ∈ a
13. cs : fset(T)
14. cs ∈ fset-ac-lub(eq;b;c)
15. xx = as ⋃ cs ∈ fset(T)
16. ∀[ys:fset(T)]
      ↑¬_bf-proper-subset-dec(eq;ys;xx)
      supposing ys ∈ f-union(deq-fset(eq);deq-fset(eq);a;as.λbs.as ⋃ bs"(fset-ac-lub(eq;b;c)))
17. {y ∈ x | deq-f-subset(eq) y xx} = {} ∈ fset(fset(T))
18. ∀[ys:fset(T)]. ¬ys ⋃ cs ⊆≠ xx supposing ys ∈ a
19. cs ∈ c
20. fset-all(b ⋃ c;ys.¬_bf-proper-subset-dec(eq;ys;cs))
⊢ False
BY
{ (RenameTo `bs' `cs' THEN SwapVars `b' `c') }

1
1. T : Type
2. eq : EqDecider(T)
3. a : {ac:fset(fset(T))| ↑fset-antichain(eq;ac)}
4. c : {ac:fset(fset(T))| ↑fset-antichain(eq;ac)}
5. b : {ac:fset(fset(T))| ↑fset-antichain(eq;ac)}
6. fset-ac-le(eq;fset-ac-glb(eq;a;b);fset-ac-glb(eq;a;fset-ac-lub(eq;c;b)))
7. x : {ac:fset(fset(T))| ↑fset-antichain(eq;ac)}
8. ∀a1:fset(T). (a1 ∈ fset-ac-glb(eq;a;c) ⇒ (¬({y ∈ x | deq-f-subset(eq) y a1} = {} ∈ fset(fset(T)))))
9. ∀a1:fset(T). (a1 ∈ fset-ac-glb(eq;a;b) ⇒ (¬({y ∈ x | deq-f-subset(eq) y a1} = {} ∈ fset(fset(T)))))
10. xx : fset(T)
11. as : fset(T)
12. as ∈ a
13. bs : fset(T)
14. bs ∈ fset-ac-lub(eq;c;b)
15. xx = as ⋃ bs ∈ fset(T)
16. ∀[ys:fset(T)]
      ↑¬_bf-proper-subset-dec(eq;ys;xx)
      supposing ys ∈ f-union(deq-fset(eq);deq-fset(eq);a;as.λbs.as ⋃ bs"(fset-ac-lub(eq;c;b)))
17. {y ∈ x | deq-f-subset(eq) y xx} = {} ∈ fset(fset(T))
18. ∀[ys:fset(T)]. ¬ys ⋃ bs ⊆≠ xx supposing ys ∈ a
19. bs ∈ b
20. fset-all(c ⋃ b;ys.¬_bf-proper-subset-dec(eq;ys;bs))
⊢ False

Latex:

Latex:
1. T : Type 2. eq : EqDecider(T) 3. a : \{ac:fset(fset(T))| \muparrow{}fset-antichain(eq;ac)\} 4. b : \{ac:fset(fset(T))| \muparrow{}fset-antichain(eq;ac)\} 5. c : \{ac:fset(fset(T))| \muparrow{}fset-antichain(eq;ac)\} 6. fset-ac-le(eq;fset-ac-glb(eq;a;c);fset-ac-glb(eq;a;fset-ac-lub(eq;b;c))) 7. x : \{ac:fset(fset(T))| \muparrow{}fset-antichain(eq;ac)\} 8. \mforall{}a1:fset(T). (a1 \mmember{} fset-ac-glb(eq;a;b) {}\mRightarrow{} (\mneg{}(\{y \mmember{} x | deq-f-subset(eq) y a1\} = \{\}))) 9. \mforall{}a1:fset(T). (a1 \mmember{} fset-ac-glb(eq;a;c) {}\mRightarrow{} (\mneg{}(\{y \mmember{} x | deq-f-subset(eq) y a1\} = \{\}))) 10. xx : fset(T) 11. as : fset(T) 12. as \mmember{} a 13. cs : fset(T) 14. cs \mmember{} fset-ac-lub(eq;b;c) 15. xx = as \mcup{} cs 16. \mforall{}[ys:fset(T)] \muparrow{}\mneg{}\msubb{}f-proper-subset-dec(eq;ys;xx) supposing ys \mmember{} f-union(deq-fset(eq);deq-fset(eq);a;as.\mlambda{}bs.as \mcup{} bs"(fset-ac-lub(eq;b;c))) 17. \{y \mmember{} x | deq-f-subset(eq) y xx\} = \{\} 18. \mforall{}[ys:fset(T)]. \mneg{}ys \mcup{} cs \msubseteq{}\mneq{} xx supposing ys \mmember{} a 19. cs \mmember{} c 20. fset-all(b \mcup{} c;ys.\mneg{}\msubb{}f-proper-subset-dec(eq;ys;cs)) \mvdash{} False By Latex: (RenameTo `bs' `cs' THEN SwapVars `b' `c') Home Index