Mercurial > hg > Members > kono > Proof > ZF-in-agda
changeset 1156:b77391353c40
filter definition?
| author | Shinji KONO <kono@ie.u-ryukyu.ac.jp> |
|---|---|
| date | Thu, 19 Jan 2023 12:17:50 +0900 |
| parents | c4fd0bfdfbae |
| children | |
| files | src/filter.agda |
| diffstat | 1 files changed, 21 insertions(+), 24 deletions(-) [+] |
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--- a/src/filter.agda Thu Jan 19 11:13:40 2023 +0900 +++ b/src/filter.agda Thu Jan 19 12:17:50 2023 +0900 @@ -48,7 +48,7 @@ filter : HOD f⊆L : filter ⊆ L filter1 : { p q : HOD } → L ∋ q → filter ∋ p → p ⊆ q → filter ∋ q - filter2 : { p q : HOD } → filter ∋ p → filter ∋ q → L ∋ (p ∩ q) → filter ∋ (p ∩ q) + filter2 : { p q : HOD } → filter ∋ p → filter ∋ q → filter ∋ (p ∩ q) open Filter @@ -121,7 +121,7 @@ lemma9 : L ∋ ((p ∪ q ) ∩ (P \ p)) lemma9 = subst (λ k → L ∋ k ) (sym (==→o≡ lemma5)) (IN Lq (NG Lp)) lemma6 : filter F ∋ ((p ∪ q ) ∩ (P \ p)) - lemma6 = filter2 F lt ¬p∈P lemma9 + lemma6 = filter2 F lt ¬p∈P lemma7 : filter F ∋ (q ∩ (P \ p)) lemma7 = subst (λ k → filter F ∋ k ) (==→o≡ lemma5 ) lemma6 lemma8 : (q ∩ (P \ p)) ⊆ q @@ -197,33 +197,30 @@ y-p⊂x : ( * y \ * p ) ⊆ * x max→ultra : {L P : HOD} (LP : L ⊆ Power P) - → ({p q : HOD} → L ∋ p → L ∋ q → L ∋ (p ∩ q)) → (F0 : Filter {L} {P} LP) → {y : Ordinal } → odef (filter F0) y → (mx : MaximumFilter {L} {P} LP F0 ) → ultra-filter ( MaximumFilter.mf mx ) -max→ultra {L} {P} LP CAP F0 {y} mfy mx = record { proper = MaximumFilter.proper mx ; ultra = ultra } where +max→ultra {L} {P} LP F0 {y} mfy mx = record { proper = MaximumFilter.proper mx ; ultra = ultra } where mf = MaximumFilter.mf mx ultra : {p : HOD} → L ∋ p → L ∋ (P \ p) → (filter mf ∋ p) ∨ (filter mf ∋ (P \ p)) ultra {p} Lp Lnp with ODC.∋-p O (filter mf) p ... | yes y = case1 y ... | no np = case2 (subst (λ k → k ∋ (P \ p)) F=mf F∋P-p) where F : HOD - F = record { od = record { def = λ x → odef L x ∧ Fp {L} {P} LP F0 mx (& p) x } - ; odmax = & L ; <odmax = λ lt → odef< (proj1 lt) } + F = record { od = record { def = λ x → Fp {L} {P} LP F0 mx (& p) x } + ; odmax = & L ; <odmax = ? } mu01 : {r : HOD} {q : HOD} → L ∋ q → F ∋ r → r ⊆ q → F ∋ q - mu01 {r} {q} Lq ⟪ Lr , record { y = y ; mfy = mfy ; y-p⊂x = y-p⊂x } ⟫ r⊆q = ⟪ Lq , record { y = y ; mfy = mfy ; y-p⊂x = mu03 } ⟫ where + mu01 {r} {q} Lq record { y = y ; mfy = mfy ; y-p⊂x = y-p⊂x } r⊆q = record { y = y ; mfy = mfy ; y-p⊂x = mu03 } where mu05 : (* y \ p) ⊆ r mu05 = subst₂ (λ j k → (* y \ j ) ⊆ k ) *iso *iso y-p⊂x mu04 : (* y \ * (& p)) ⊆ * (& q) mu04 {x} ⟪ yx , npx ⟫ = subst (λ k → odef k x ) (sym *iso) (r⊆q (mu05 ⟪ yx , (λ px1 → npx (subst (λ k → odef k x) (sym *iso) px1 )) ⟫ ) ) mu03 : (* y \ * (& p)) ⊆ * (& q) mu03 = mu04 - mu02 : {r : HOD} {q : HOD} → F ∋ r → F ∋ q → L ∋ (r ∩ q) → F ∋ (r ∩ q) - mu02 {r} {q} ⟪ Lr , record { y = ry ; mfy = mfry ; y-p⊂x = ry-p⊂x } ⟫ - ⟪ Lq , record { y = qy ; mfy = mfqy ; y-p⊂x = qy-p⊂x } ⟫ Lrq = ⟪ Lrq , record { y = & (* qy ∩ * ry) ; mfy = mu20 ; y-p⊂x = mu22 } ⟫ where - mu21 : L ∋ (* qy ∩ * ry) - mu21 = CAP (subst (λ k → odef L k ) (sym &iso) (f⊆L mf mfqy)) (subst (λ k → odef L k ) (sym &iso) (f⊆L mf mfry)) + mu02 : {r : HOD} {q : HOD} → F ∋ r → F ∋ q → F ∋ (r ∩ q) + mu02 {r} {q} record { y = ry ; mfy = mfry ; y-p⊂x = ry-p⊂x } + record { y = qy ; mfy = mfqy ; y-p⊂x = qy-p⊂x } = record { y = & (* qy ∩ * ry) ; mfy = mu20 ; y-p⊂x = mu22 } where mu20 : odef (filter mf) (& (* qy ∩ * ry)) - mu20 = filter2 mf (subst (λ k → odef (filter mf) k) (sym &iso) mfqy) (subst (λ k → odef (filter mf) k) (sym &iso) mfry) mu21 + mu20 = filter2 mf (subst (λ k → odef (filter mf) k) (sym &iso) mfqy) (subst (λ k → odef (filter mf) k) (sym &iso) mfry) mu24 : ((* qy ∩ * ry) \ * (& p)) ⊆ (r ∩ q) mu24 {x} ⟪ qry , npx ⟫ = ⟪ subst (λ k → odef k x) *iso ( ry-p⊂x ⟪ proj2 qry , npx ⟫ ) , subst (λ k → odef k x) *iso ( qy-p⊂x ⟪ proj1 qry , npx ⟫ ) ⟫ @@ -232,13 +229,13 @@ mu22 : (* (& (* qy ∩ * ry)) \ * (& p)) ⊆ * (& (r ∩ q)) mu22 = subst₂ (λ j k → (j \ * (& p)) ⊆ k ) (sym *iso) (sym *iso) mu23 FisFilter : Filter {L} {P} LP - FisFilter = record { filter = F ; f⊆L = λ {x} lt → proj1 lt ; filter1 = mu01 ; filter2 = mu02 } + FisFilter = record { filter = F ; f⊆L = λ {x} lt → ? ; filter1 = mu01 ; filter2 = mu02 } FisGreater : {x : Ordinal } → odef (filter (MaximumFilter.mf mx)) x → odef (filter FisFilter ) x - FisGreater {x} mfx = ⟪ f⊆L mf mfx , record { y = x ; mfy = mfx ; y-p⊂x = mu03 } ⟫ where + FisGreater {x} mfx = record { y = x ; mfy = mfx ; y-p⊂x = mu03 } where mu03 : (* x \ * (& p)) ⊆ * x mu03 {z} ⟪ xz , _ ⟫ = xz F∋P-p : F ∋ (P \ p ) - F∋P-p = ⟪ Lnp , record { y = y ; mfy = mxy ; y-p⊂x = mu30 } ⟫ where + F∋P-p = record { y = y ; mfy = mxy ; y-p⊂x = mu30 } where mxy : odef (filter (MaximumFilter.mf mx)) y mxy = MaximumFilter.F⊆mf mx mfy mu30 : (* y \ * (& p)) ⊆ * (& (P \ p)) @@ -246,14 +243,14 @@ Pz : odef P z Pz = LP (f⊆L mf mxy ) _ yz FisProper : ¬ (filter FisFilter ∋ od∅) -- if F contains p, p is in mf which contract np - FisProper ⟪ L0 , record { y = z ; mfy = mfz ; y-p⊂x = z-p⊂x } ⟫ = + FisProper record { y = z ; mfy = mfz ; y-p⊂x = z-p⊂x } = ⊥-elim ( np (filter1 mf Lp (subst (λ k → odef (filter mf) k) (sym &iso) mfz) mu31) ) where mu31 : * z ⊆ p mu31 {x} zx with ODC.decp O (odef p x) ... | yes px = px ... | no npx = ⊥-elim ( ¬x<0 (subst (λ k → odef k x) *iso (z-p⊂x ⟪ zx , (λ px → npx (subst (λ k → odef k x) *iso px) ) ⟫ ) ) ) F0⊆F : filter F0 ⊆ F - F0⊆F {x} fx = ⟪ f⊆L F0 fx , record { y = _ ; mfy = MaximumFilter.F⊆mf mx fx ; y-p⊂x = mu42 } ⟫ where + F0⊆F {x} fx = record { y = _ ; mfy = MaximumFilter.F⊆mf mx fx ; y-p⊂x = mu42 } where mu42 : (* x \ * (& p)) ⊆ * x mu42 {z} ⟪ xz , ¬p ⟫ = xz F=mf : F ≡ filter mf @@ -263,8 +260,8 @@ open _==_ -ultra→max : {L P : HOD} (LP : L ⊆ Power P) → ({p : HOD} - → L ∋ p → L ∋ ( P \ p)) +ultra→max : {L P : HOD} (LP : L ⊆ Power P) + → ({p : HOD} → L ∋ p → L ∋ ( P \ p)) → ({p q : HOD} → L ∋ p → L ∋ q → L ∋ (p ∩ q)) → (U : Filter {L} {P} LP) → ultra-filter U → MaximumFilter LP U ultra→max {L} {P} LP NG CAP U u = record { mf = U ; F⊆mf = λ x → x ; proper = ultra-filter.proper u ; is-maximum = is-maximum } where @@ -299,7 +296,7 @@ F∋-p : filter F ∋ ( P \ p ) F∋-p = U⊆F U∋-p f0 : filter F ∋ od∅ - f0 = subst (λ k → odef (filter F) k ) (trans (cong (&) ∩-comm) (cong (&) [a-b]∩b=0 ) ) ( filter2 F F∋p F∋-p ( CAP L∋p L∋-p) ) + f0 = subst (λ k → odef (filter F) k ) (trans (cong (&) ∩-comm) (cong (&) [a-b]∩b=0 ) ) ( filter2 F F∋p F∋-p ) -- if there is a filter , there is a ultra filter under the axiom of choise -- Zorn Lemma @@ -308,7 +305,7 @@ field f⊆L : (* filter) ⊆ L filter1 : { p q : Ordinal } → odef L q → odef (* filter) p → (* p) ⊆ (* q) → odef (* filter) q - filter2 : { p q : Ordinal } → odef (* filter) p → odef (* filter) q → odef L (& ((* p) ∩ (* q))) → odef (* filter) (& ((* p) ∩ (* q))) + filter2 : { p q : Ordinal } → odef (* filter) p → odef (* filter) q → odef (* filter) (& ((* p) ∩ (* q))) proper : ¬ (odef (* filter ) o∅) Filter-is-Filter : { L P : HOD } (LP : L ⊆ Power P) → (F : Filter {L} {P} LP) → (proper : ¬ (filter F) ∋ od∅ ) → IsFilter {L} {P} LP (& (filter F)) @@ -316,8 +313,8 @@ f⊆L = subst (λ k → k ⊆ L ) (sym *iso) (f⊆L F) ; filter1 = λ {p} {q} Lq Fp p⊆q → subst₂ (λ j k → odef j k ) (sym *iso) &iso ( filter1 F (subst (λ k → odef L k) (sym &iso) Lq) (subst₂ (λ j k → odef j k ) *iso (sym &iso) Fp) p⊆q ) - ; filter2 = λ {p} {q} Fp Fq Lpq → subst₂ (λ j k → odef j k ) (sym *iso) refl ( filter2 F (subst₂ (λ j k → odef j k ) *iso (sym &iso) Fp) - (subst₂ (λ j k → odef j k ) *iso (sym &iso) Fq) Lpq ) + ; filter2 = λ {p} {q} Fp Fq → subst₂ (λ j k → odef j k ) (sym *iso) refl ( filter2 F (subst₂ (λ j k → odef j k ) *iso (sym &iso) Fp) + (subst₂ (λ j k → odef j k ) *iso (sym &iso) Fq) ) ; proper = subst₂ (λ j k → ¬ odef j k ) (sym *iso) ord-od∅ proper }