Mercurial > hg > Members > kono > Proof > ZF-in-agda
annotate ordinal.agda @ 213:22d435172d1a
separate logic and nat
| author | Shinji KONO <kono@ie.u-ryukyu.ac.jp> |
|---|---|
| date | Fri, 02 Aug 2019 12:17:10 +0900 |
| parents | d4802eb159ff |
| children | eee983e4b402 |
| rev | line source |
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| 34 | 1 {-# OPTIONS --allow-unsolved-metas #-} |
| 16 | 2 open import Level |
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3 module ordinal where |
| 3 | 4 |
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5 open import zf |
| 3 | 6 |
| 23 | 7 open import Data.Nat renaming ( zero to Zero ; suc to Suc ; ℕ to Nat ; _⊔_ to _n⊔_ ) |
| 75 | 8 open import Data.Empty |
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9 open import Relation.Binary.PropositionalEquality |
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10 open import logic |
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11 open import nat |
| 3 | 12 |
| 24 | 13 data OrdinalD {n : Level} : (lv : Nat) → Set n where |
| 14 Φ : (lv : Nat) → OrdinalD lv | |
| 15 OSuc : (lv : Nat) → OrdinalD {n} lv → OrdinalD lv | |
| 3 | 16 |
| 24 | 17 record Ordinal {n : Level} : Set n where |
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18 constructor ordinal |
| 16 | 19 field |
| 20 lv : Nat | |
| 24 | 21 ord : OrdinalD {n} lv |
| 16 | 22 |
| 24 | 23 data _d<_ {n : Level} : {lx ly : Nat} → OrdinalD {n} lx → OrdinalD {n} ly → Set n where |
| 24 Φ< : {lx : Nat} → {x : OrdinalD {n} lx} → Φ lx d< OSuc lx x | |
| 25 s< : {lx : Nat} → {x y : OrdinalD {n} lx} → x d< y → OSuc lx x d< OSuc lx y | |
| 17 | 26 |
| 27 open Ordinal | |
| 28 | |
| 27 | 29 _o<_ : {n : Level} ( x y : Ordinal ) → Set n |
| 17 | 30 _o<_ x y = (lv x < lv y ) ∨ ( ord x d< ord y ) |
| 3 | 31 |
| 75 | 32 s<refl : {n : Level } {lx : Nat } { x : OrdinalD {n} lx } → x d< OSuc lx x |
| 33 s<refl {n} {lv} {Φ lv} = Φ< | |
| 34 s<refl {n} {lv} {OSuc lv x} = s< s<refl | |
| 35 | |
| 36 trio<> : {n : Level} → {lx : Nat} {x : OrdinalD {n} lx } { y : OrdinalD lx } → y d< x → x d< y → ⊥ | |
| 37 trio<> {n} {lx} {.(OSuc lx _)} {.(OSuc lx _)} (s< s) (s< t) = trio<> s t | |
| 38 trio<> {n} {lx} {.(OSuc lx _)} {.(Φ lx)} Φ< () | |
| 39 | |
| 40 d<→lv : {n : Level} {x y : Ordinal {n}} → ord x d< ord y → lv x ≡ lv y | |
| 41 d<→lv Φ< = refl | |
| 42 d<→lv (s< lt) = refl | |
| 43 | |
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equalitu and internal parametorisity
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44 o<-subst : {n : Level } {Z X z x : Ordinal {n}} → Z o< X → Z ≡ z → X ≡ x → z o< x |
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45 o<-subst df refl refl = df |
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46 |
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47 open import Data.Nat.Properties |
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problem on Ordinal ( OSuc ℵ )
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48 open import Data.Unit using ( ⊤ ) |
| 6 | 49 open import Relation.Nullary |
| 50 | |
| 51 open import Relation.Binary | |
| 52 open import Relation.Binary.Core | |
| 53 | |
| 24 | 54 o∅ : {n : Level} → Ordinal {n} |
| 55 o∅ = record { lv = Zero ; ord = Φ Zero } | |
| 21 | 56 |
| 39 | 57 open import Relation.Binary.HeterogeneousEquality using (_≅_;refl) |
| 58 | |
| 59 ordinal-cong : {n : Level} {x y : Ordinal {n}} → | |
| 60 lv x ≡ lv y → ord x ≅ ord y → x ≡ y | |
| 61 ordinal-cong refl refl = refl | |
| 21 | 62 |
| 46 | 63 ordinal-lv : {n : Level} {x y : Ordinal {n}} → x ≡ y → lv x ≡ lv y |
| 64 ordinal-lv refl = refl | |
| 65 | |
| 66 ordinal-d : {n : Level} {x y : Ordinal {n}} → x ≡ y → ord x ≅ ord y | |
| 67 ordinal-d refl = refl | |
| 68 | |
| 24 | 69 ≡→¬d< : {n : Level} → {lv : Nat} → {x : OrdinalD {n} lv } → x d< x → ⊥ |
| 70 ≡→¬d< {n} {lx} {OSuc lx y} (s< t) = ≡→¬d< t | |
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71 |
| 24 | 72 trio<≡ : {n : Level} → {lx : Nat} {x : OrdinalD {n} lx } { y : OrdinalD lx } → x ≡ y → x d< y → ⊥ |
| 17 | 73 trio<≡ refl = ≡→¬d< |
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74 |
| 24 | 75 trio>≡ : {n : Level} → {lx : Nat} {x : OrdinalD {n} lx } { y : OrdinalD lx } → x ≡ y → y d< x → ⊥ |
| 17 | 76 trio>≡ refl = ≡→¬d< |
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77 |
| 24 | 78 triO : {n : Level} → {lx ly : Nat} → OrdinalD {n} lx → OrdinalD {n} ly → Tri (lx < ly) ( lx ≡ ly ) ( lx > ly ) |
| 79 triO {n} {lx} {ly} x y = <-cmp lx ly | |
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80 |
| 24 | 81 triOrdd : {n : Level} → {lx : Nat} → Trichotomous _≡_ ( _d<_ {n} {lx} {lx} ) |
| 82 triOrdd {_} {lv} (Φ lv) (Φ lv) = tri≈ ≡→¬d< refl ≡→¬d< | |
| 83 triOrdd {_} {lv} (Φ lv) (OSuc lv y) = tri< Φ< (λ ()) ( λ lt → trio<> lt Φ< ) | |
| 84 triOrdd {_} {lv} (OSuc lv x) (Φ lv) = tri> (λ lt → trio<> lt Φ<) (λ ()) Φ< | |
| 85 triOrdd {_} {lv} (OSuc lv x) (OSuc lv y) with triOrdd x y | |
| 86 triOrdd {_} {lv} (OSuc lv x) (OSuc lv y) | tri< a ¬b ¬c = tri< (s< a) (λ tx=ty → trio<≡ tx=ty (s< a) ) ( λ lt → trio<> lt (s< a) ) | |
| 87 triOrdd {_} {lv} (OSuc lv x) (OSuc lv x) | tri≈ ¬a refl ¬c = tri≈ ≡→¬d< refl ≡→¬d< | |
| 88 triOrdd {_} {lv} (OSuc lv x) (OSuc lv y) | tri> ¬a ¬b c = tri> ( λ lt → trio<> lt (s< c) ) (λ tx=ty → trio>≡ tx=ty (s< c) ) (s< c) | |
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89 |
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90 osuc : {n : Level} ( x : Ordinal {n} ) → Ordinal {n} |
| 75 | 91 osuc record { lv = lx ; ord = ox } = record { lv = lx ; ord = OSuc lx ox } |
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92 |
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93 <-osuc : {n : Level} { x : Ordinal {n} } → x o< osuc x |
| 75 | 94 <-osuc {n} {record { lv = lx ; ord = Φ .lx }} = case2 Φ< |
| 95 <-osuc {n} {record { lv = lx ; ord = OSuc .lx ox }} = case2 ( s< s<refl ) | |
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96 |
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97 osuc-lveq : {n : Level} { x : Ordinal {n} } → lv x ≡ lv ( osuc x ) |
| 75 | 98 osuc-lveq {n} = refl |
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99 |
| 113 | 100 osucc : {n : Level} {ox oy : Ordinal {n}} → oy o< ox → osuc oy o< osuc ox |
| 101 osucc {n} {ox} {oy} (case1 x) = case1 x | |
| 102 osucc {n} {ox} {oy} (case2 x) with d<→lv x | |
| 103 ... | refl = case2 (s< x) | |
| 104 | |
| 147 | 105 case12-⊥ : {n : Level} {x y : Ordinal {suc n}} → lv x < lv y → ord x d< ord y → ⊥ |
| 106 case12-⊥ {x} {y} lt1 lt2 with d<→lv lt2 | |
| 107 ... | refl = nat-≡< refl lt1 | |
| 108 | |
| 109 case21-⊥ : {n : Level} {x y : Ordinal {suc n}} → lv x < lv y → ord y d< ord x → ⊥ | |
| 110 case21-⊥ {x} {y} lt1 lt2 with d<→lv lt2 | |
| 111 ... | refl = nat-≡< refl lt1 | |
| 112 | |
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113 o<¬≡ : {n : Level } { ox oy : Ordinal {suc n}} → ox ≡ oy → ox o< oy → ⊥ |
| 111 | 114 o<¬≡ {_} {ox} {ox} refl (case1 lt) = =→¬< lt |
| 115 o<¬≡ {_} {ox} {ox} refl (case2 (s< lt)) = trio<≡ refl lt | |
| 94 | 116 |
| 117 ¬x<0 : {n : Level} → { x : Ordinal {suc n} } → ¬ ( x o< o∅ {suc n} ) | |
| 118 ¬x<0 {n} {x} (case1 ()) | |
| 119 ¬x<0 {n} {x} (case2 ()) | |
| 120 | |
| 81 | 121 o<> : {n : Level} → {x y : Ordinal {n} } → y o< x → x o< y → ⊥ |
| 122 o<> {n} {x} {y} (case1 x₁) (case1 x₂) = nat-<> x₁ x₂ | |
| 123 o<> {n} {x} {y} (case1 x₁) (case2 x₂) = nat-≡< (sym (d<→lv x₂)) x₁ | |
| 124 o<> {n} {x} {y} (case2 x₁) (case1 x₂) = nat-≡< (sym (d<→lv x₁)) x₂ | |
| 125 o<> {n} {record { lv = lv₁ ; ord = .(OSuc lv₁ _) }} {record { lv = .lv₁ ; ord = .(Φ lv₁) }} (case2 Φ<) (case2 ()) | |
| 126 o<> {n} {record { lv = lv₁ ; ord = .(OSuc lv₁ _) }} {record { lv = .lv₁ ; ord = .(OSuc lv₁ _) }} (case2 (s< y<x)) (case2 (s< x<y)) = | |
| 127 o<> (case2 y<x) (case2 x<y) | |
| 16 | 128 |
| 24 | 129 orddtrans : {n : Level} {lx : Nat} {x y z : OrdinalD {n} lx } → x d< y → y d< z → x d< z |
| 130 orddtrans {_} {lx} {.(Φ lx)} {.(OSuc lx _)} {.(OSuc lx _)} Φ< (s< y<z) = Φ< | |
| 131 orddtrans {_} {lx} {.(OSuc lx _)} {.(OSuc lx _)} {.(OSuc lx _)} (s< x<y) (s< y<z) = s< ( orddtrans x<y y<z ) | |
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132 |
| 75 | 133 osuc-≡< : {n : Level} { a x : Ordinal {n} } → x o< osuc a → (x ≡ a ) ∨ (x o< a) |
| 134 osuc-≡< {n} {a} {x} (case1 lt) = case2 (case1 lt) | |
| 135 osuc-≡< {n} {record { lv = lv₁ ; ord = Φ .lv₁ }} {record { lv = .lv₁ ; ord = .(Φ lv₁) }} (case2 Φ<) = case1 refl | |
| 136 osuc-≡< {n} {record { lv = lv₁ ; ord = OSuc .lv₁ ord₁ }} {record { lv = .lv₁ ; ord = .(Φ lv₁) }} (case2 Φ<) = case2 (case2 Φ<) | |
| 137 osuc-≡< {n} {record { lv = lv₁ ; ord = Φ .lv₁ }} {record { lv = .lv₁ ; ord = .(OSuc lv₁ _) }} (case2 (s< ())) | |
| 138 osuc-≡< {n} {record { lv = la ; ord = OSuc la oa }} {record { lv = la ; ord = (OSuc la ox) }} (case2 (s< lt)) with | |
| 139 osuc-≡< {n} {record { lv = la ; ord = oa }} {record { lv = la ; ord = ox }} (case2 lt ) | |
| 140 ... | case1 refl = case1 refl | |
| 141 ... | case2 (case2 x) = case2 (case2( s< x) ) | |
| 142 ... | case2 (case1 x) = ⊥-elim (¬a≤a x) where | |
| 143 | |
| 144 osuc-< : {n : Level} { x y : Ordinal {n} } → y o< osuc x → x o< y → ⊥ | |
| 145 osuc-< {n} {x} {y} y<ox x<y with osuc-≡< y<ox | |
| 146 osuc-< {n} {x} {x} y<ox (case1 x₁) | case1 refl = ⊥-elim (¬a≤a x₁) | |
| 147 osuc-< {n} {x} {x} (case1 x₂) (case2 x₁) | case1 refl = ⊥-elim (¬a≤a x₂) | |
| 148 osuc-< {n} {x} {x} (case2 x₂) (case2 x₁) | case1 refl = ≡→¬d< x₁ | |
| 81 | 149 osuc-< {n} {x} {y} y<ox (case1 x₂) | case2 (case1 x₁) = nat-<> x₂ x₁ |
| 150 osuc-< {n} {x} {y} y<ox (case1 x₂) | case2 (case2 x₁) = nat-≡< (sym (d<→lv x₁)) x₂ | |
| 151 osuc-< {n} {x} {y} y<ox (case2 x<y) | case2 y<x = o<> (case2 x<y) y<x | |
| 75 | 152 |
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153 max : (x y : Nat) → Nat |
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154 max Zero Zero = Zero |
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155 max Zero (Suc x) = (Suc x) |
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156 max (Suc x) Zero = (Suc x) |
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157 max (Suc x) (Suc y) = Suc ( max x y ) |
| 3 | 158 |
| 24 | 159 maxαd : {n : Level} → { lx : Nat } → OrdinalD {n} lx → OrdinalD lx → OrdinalD lx |
| 17 | 160 maxαd x y with triOrdd x y |
| 161 maxαd x y | tri< a ¬b ¬c = y | |
| 162 maxαd x y | tri≈ ¬a b ¬c = x | |
| 163 maxαd x y | tri> ¬a ¬b c = x | |
| 6 | 164 |
| 127 | 165 minαd : {n : Level} → { lx : Nat } → OrdinalD {n} lx → OrdinalD lx → OrdinalD lx |
| 166 minαd x y with triOrdd x y | |
| 167 minαd x y | tri< a ¬b ¬c = x | |
| 168 minαd x y | tri≈ ¬a b ¬c = y | |
| 169 minαd x y | tri> ¬a ¬b c = x | |
| 170 | |
| 24 | 171 _o≤_ : {n : Level} → Ordinal → Ordinal → Set (suc n) |
| 23 | 172 a o≤ b = (a ≡ b) ∨ ( a o< b ) |
| 173 | |
| 27 | 174 ordtrans : {n : Level} {x y z : Ordinal {n} } → x o< y → y o< z → x o< z |
| 175 ordtrans {n} {x} {y} {z} (case1 x₁) (case1 x₂) = case1 ( <-trans x₁ x₂ ) | |
| 81 | 176 ordtrans {n} {x} {y} {z} (case1 x₁) (case2 x₂) with d<→lv x₂ |
| 27 | 177 ... | refl = case1 x₁ |
| 81 | 178 ordtrans {n} {x} {y} {z} (case2 x₁) (case1 x₂) with d<→lv x₁ |
| 27 | 179 ... | refl = case1 x₂ |
| 180 ordtrans {n} {x} {y} {z} (case2 x₁) (case2 x₂) with d<→lv x₁ | d<→lv x₂ | |
| 181 ... | refl | refl = case2 ( orddtrans x₁ x₂ ) | |
| 182 | |
| 24 | 183 trio< : {n : Level } → Trichotomous {suc n} _≡_ _o<_ |
| 23 | 184 trio< a b with <-cmp (lv a) (lv b) |
| 24 | 185 trio< a b | tri< a₁ ¬b ¬c = tri< (case1 a₁) (λ refl → ¬b (cong ( λ x → lv x ) refl ) ) lemma1 where |
| 186 lemma1 : ¬ (Suc (lv b) ≤ lv a) ∨ (ord b d< ord a) | |
| 187 lemma1 (case1 x) = ¬c x | |
| 81 | 188 lemma1 (case2 x) = ⊥-elim (nat-≡< (sym ( d<→lv x )) a₁ ) |
| 24 | 189 trio< a b | tri> ¬a ¬b c = tri> lemma1 (λ refl → ¬b (cong ( λ x → lv x ) refl ) ) (case1 c) where |
| 190 lemma1 : ¬ (Suc (lv a) ≤ lv b) ∨ (ord a d< ord b) | |
| 191 lemma1 (case1 x) = ¬a x | |
| 81 | 192 lemma1 (case2 x) = ⊥-elim (nat-≡< (sym ( d<→lv x )) c ) |
| 23 | 193 trio< a b | tri≈ ¬a refl ¬c with triOrdd ( ord a ) ( ord b ) |
| 24 | 194 trio< record { lv = .(lv b) ; ord = x } b | tri≈ ¬a refl ¬c | tri< a ¬b ¬c₁ = tri< (case2 a) (λ refl → ¬b (lemma1 refl )) lemma2 where |
| 195 lemma1 : (record { lv = _ ; ord = x }) ≡ b → x ≡ ord b | |
| 196 lemma1 refl = refl | |
| 197 lemma2 : ¬ (Suc (lv b) ≤ lv b) ∨ (ord b d< x) | |
| 198 lemma2 (case1 x) = ¬a x | |
| 199 lemma2 (case2 x) = trio<> x a | |
| 200 trio< record { lv = .(lv b) ; ord = x } b | tri≈ ¬a refl ¬c | tri> ¬a₁ ¬b c = tri> lemma2 (λ refl → ¬b (lemma1 refl )) (case2 c) where | |
| 201 lemma1 : (record { lv = _ ; ord = x }) ≡ b → x ≡ ord b | |
| 202 lemma1 refl = refl | |
| 203 lemma2 : ¬ (Suc (lv b) ≤ lv b) ∨ (x d< ord b) | |
| 204 lemma2 (case1 x) = ¬a x | |
| 205 lemma2 (case2 x) = trio<> x c | |
| 206 trio< record { lv = .(lv b) ; ord = x } b | tri≈ ¬a refl ¬c | tri≈ ¬a₁ refl ¬c₁ = tri≈ lemma1 refl lemma1 where | |
| 207 lemma1 : ¬ (Suc (lv b) ≤ lv b) ∨ (ord b d< ord b) | |
| 208 lemma1 (case1 x) = ¬a x | |
| 209 lemma1 (case2 x) = ≡→¬d< x | |
| 23 | 210 |
| 180 | 211 xo<ab : {n : Level} {oa ob : Ordinal {suc n}} → ( {ox : Ordinal {suc n}} → ox o< oa → ox o< ob ) → oa o< osuc ob |
| 212 xo<ab {n} {oa} {ob} a→b with trio< oa ob | |
| 213 xo<ab {n} {oa} {ob} a→b | tri< a ¬b ¬c = ordtrans a <-osuc | |
| 214 xo<ab {n} {oa} {ob} a→b | tri≈ ¬a refl ¬c = <-osuc | |
| 215 xo<ab {n} {oa} {ob} a→b | tri> ¬a ¬b c = ⊥-elim ( o<¬≡ refl (a→b c ) ) | |
| 216 | |
| 129 | 217 maxα : {n : Level} → Ordinal {suc n} → Ordinal → Ordinal |
| 218 maxα x y with trio< x y | |
| 127 | 219 maxα x y | tri< a ¬b ¬c = y |
| 220 maxα x y | tri> ¬a ¬b c = x | |
| 129 | 221 maxα x y | tri≈ ¬a refl ¬c = x |
| 84 | 222 |
| 129 | 223 minα : {n : Level} → Ordinal {suc n} → Ordinal → Ordinal |
| 224 minα {n} x y with trio< {n} x y | |
| 127 | 225 minα x y | tri< a ¬b ¬c = x |
| 226 minα x y | tri> ¬a ¬b c = y | |
| 129 | 227 minα x y | tri≈ ¬a refl ¬c = x |
| 228 | |
| 229 min1 : {n : Level} → {x y z : Ordinal {suc n} } → z o< x → z o< y → z o< minα x y | |
| 230 min1 {n} {x} {y} {z} z<x z<y with trio< {n} x y | |
| 231 min1 {n} {x} {y} {z} z<x z<y | tri< a ¬b ¬c = z<x | |
| 232 min1 {n} {x} {y} {z} z<x z<y | tri≈ ¬a refl ¬c = z<x | |
| 233 min1 {n} {x} {y} {z} z<x z<y | tri> ¬a ¬b c = z<y | |
| 234 | |
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235 -- |
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236 -- max ( osuc x , osuc y ) |
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237 -- |
| 88 | 238 |
| 84 | 239 omax : {n : Level} ( x y : Ordinal {suc n} ) → Ordinal {suc n} |
| 88 | 240 omax {n} x y with trio< x y |
| 84 | 241 omax {n} x y | tri< a ¬b ¬c = osuc y |
| 242 omax {n} x y | tri> ¬a ¬b c = osuc x | |
| 88 | 243 omax {n} x y | tri≈ ¬a refl ¬c = osuc x |
| 84 | 244 |
| 245 omax< : {n : Level} ( x y : Ordinal {suc n} ) → x o< y → osuc y ≡ omax x y | |
| 88 | 246 omax< {n} x y lt with trio< x y |
| 84 | 247 omax< {n} x y lt | tri< a ¬b ¬c = refl |
| 88 | 248 omax< {n} x y lt | tri≈ ¬a b ¬c = ⊥-elim (¬a lt ) |
| 249 omax< {n} x y lt | tri> ¬a ¬b c = ⊥-elim (¬a lt ) | |
| 250 | |
| 251 omax≡ : {n : Level} ( x y : Ordinal {suc n} ) → x ≡ y → osuc y ≡ omax x y | |
| 252 omax≡ {n} x y eq with trio< x y | |
| 253 omax≡ {n} x y eq | tri< a ¬b ¬c = ⊥-elim (¬b eq ) | |
| 254 omax≡ {n} x y eq | tri≈ ¬a refl ¬c = refl | |
| 255 omax≡ {n} x y eq | tri> ¬a ¬b c = ⊥-elim (¬b eq ) | |
| 84 | 256 |
| 86 | 257 omax-x : {n : Level} ( x y : Ordinal {suc n} ) → x o< omax x y |
| 88 | 258 omax-x {n} x y with trio< x y |
| 259 omax-x {n} x y | tri< a ¬b ¬c = ordtrans a <-osuc | |
| 86 | 260 omax-x {n} x y | tri> ¬a ¬b c = <-osuc |
| 88 | 261 omax-x {n} x y | tri≈ ¬a refl ¬c = <-osuc |
| 86 | 262 |
| 263 omax-y : {n : Level} ( x y : Ordinal {suc n} ) → y o< omax x y | |
| 88 | 264 omax-y {n} x y with trio< x y |
| 86 | 265 omax-y {n} x y | tri< a ¬b ¬c = <-osuc |
| 88 | 266 omax-y {n} x y | tri> ¬a ¬b c = ordtrans c <-osuc |
| 267 omax-y {n} x y | tri≈ ¬a refl ¬c = <-osuc | |
| 86 | 268 |
| 88 | 269 omxx : {n : Level} ( x : Ordinal {suc n} ) → omax x x ≡ osuc x |
| 270 omxx {n} x with trio< x x | |
| 271 omxx {n} x | tri< a ¬b ¬c = ⊥-elim (¬b refl ) | |
| 272 omxx {n} x | tri> ¬a ¬b c = ⊥-elim (¬b refl ) | |
| 273 omxx {n} x | tri≈ ¬a refl ¬c = refl | |
| 86 | 274 |
| 275 omxxx : {n : Level} ( x : Ordinal {suc n} ) → omax x (omax x x ) ≡ osuc (osuc x) | |
| 88 | 276 omxxx {n} x = trans ( cong ( λ k → omax x k ) (omxx x )) (sym ( omax< x (osuc x) <-osuc )) |
| 86 | 277 |
| 91 | 278 open _∧_ |
| 279 | |
| 280 osuc2 : {n : Level} ( x y : Ordinal {suc n} ) → ( osuc x o< osuc (osuc y )) ⇔ (x o< osuc y) | |
| 281 proj1 (osuc2 {n} x y) (case1 lt) = case1 lt | |
| 282 proj1 (osuc2 {n} x y) (case2 (s< lt)) = case2 lt | |
| 283 proj2 (osuc2 {n} x y) (case1 lt) = case1 lt | |
| 284 proj2 (osuc2 {n} x y) (case2 lt) with d<→lv lt | |
| 285 ... | refl = case2 (s< lt) | |
| 286 | |
| 24 | 287 OrdTrans : {n : Level} → Transitive {suc n} _o≤_ |
| 16 | 288 OrdTrans (case1 refl) (case1 refl) = case1 refl |
| 289 OrdTrans (case1 refl) (case2 lt2) = case2 lt2 | |
| 290 OrdTrans (case2 lt1) (case1 refl) = case2 lt1 | |
| 81 | 291 OrdTrans (case2 x) (case2 y) = case2 (ordtrans x y) |
| 16 | 292 |
| 24 | 293 OrdPreorder : {n : Level} → Preorder (suc n) (suc n) (suc n) |
| 294 OrdPreorder {n} = record { Carrier = Ordinal | |
| 16 | 295 ; _≈_ = _≡_ |
| 23 | 296 ; _∼_ = _o≤_ |
| 16 | 297 ; isPreorder = record { |
| 298 isEquivalence = record { refl = refl ; sym = sym ; trans = trans } | |
| 299 ; reflexive = case1 | |
| 24 | 300 ; trans = OrdTrans |
| 16 | 301 } |
| 302 } | |
| 303 | |
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304 TransFinite : {n m : Level} → { ψ : Ordinal {suc n} → Set m } |
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305 → ( ∀ (lx : Nat ) → ( (x : Ordinal {suc n} ) → x o< ordinal lx (Φ lx) → ψ x ) → ψ ( record { lv = lx ; ord = Φ lx } ) ) |
| 24 | 306 → ( ∀ (lx : Nat ) → (x : OrdinalD lx ) → ψ ( record { lv = lx ; ord = x } ) → ψ ( record { lv = lx ; ord = OSuc lx x } ) ) |
| 22 | 307 → ∀ (x : Ordinal) → ψ x |
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308 TransFinite {n} {m} {ψ} caseΦ caseOSuc x = proj1 (TransFinite1 (lv x) (ord x) ) where |
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309 TransFinite1 : (lx : Nat) (ox : OrdinalD lx ) → ψ (ordinal lx ox) ∧ ( ( (x : Ordinal {suc n} ) → x o< ordinal lx (Φ lx) → ψ x ) ) |
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310 TransFinite1 Zero (Φ 0) = record { proj1 = caseΦ Zero lemma ; proj2 = lemma1 } where |
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311 lemma : (x : Ordinal) → x o< ordinal Zero (Φ Zero) → ψ x |
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312 lemma x (case1 ()) |
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313 lemma x (case2 ()) |
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314 lemma1 : (x : Ordinal) → x o< ordinal Zero (Φ Zero) → ψ x |
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315 lemma1 x (case1 ()) |
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316 lemma1 x (case2 ()) |
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317 TransFinite1 (Suc lx) (Φ (Suc lx)) = record { proj1 = caseΦ (Suc lx) (λ x → lemma (lv x) (ord x)) ; proj2 = (λ x → lemma (lv x) (ord x)) } where |
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318 lemma0 : (ly : Nat) (oy : OrdinalD ly ) → ordinal ly oy o< ordinal lx (Φ lx) → ψ (ordinal ly oy) |
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319 lemma0 ly oy lt = proj2 ( TransFinite1 lx (Φ lx) ) (ordinal ly oy) lt |
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320 lemma : (ly : Nat) (oy : OrdinalD ly ) → ordinal ly oy o< ordinal (Suc lx) (Φ (Suc lx)) → ψ (ordinal ly oy) |
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321 lemma lx1 ox1 (case1 lt) with <-∨ lt |
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322 lemma lx (Φ lx) (case1 lt) | case1 refl = proj1 ( TransFinite1 lx (Φ lx) ) |
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323 lemma lx (Φ lx) (case1 lt) | case2 (s≤s lt1) = lemma0 lx (Φ lx) (case1 (s≤s lt1)) |
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324 lemma lx (OSuc lx ox1) (case1 lt) | case1 refl = caseOSuc lx ox1 ( lemma lx ox1 (case1 a<sa)) |
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325 lemma lx1 (OSuc lx1 ox1) (case1 lt) | case2 lt1 = caseOSuc lx1 ox1 ( lemma lx1 ox1 (case1 (<-trans lt1 a<sa ))) |
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326 TransFinite1 lx (OSuc lx ox) = record { proj1 = caseOSuc lx ox (proj1 (TransFinite1 lx ox )) ; proj2 = proj2 (TransFinite1 lx ox )} |
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327 |
| 184 | 328 -- we cannot prove this in intutionistic logic |
| 142 | 329 -- (¬ (∀ y → ¬ ( ψ y ))) → (ψ y → p ) → p |
| 166 | 330 -- postulate |
| 331 -- TransFiniteExists : {n m l : Level} → ( ψ : Ordinal {n} → Set m ) | |
| 332 -- → (exists : ¬ (∀ y → ¬ ( ψ y ) )) | |
| 333 -- → {p : Set l} ( P : { y : Ordinal {n} } → ψ y → p ) | |
| 334 -- → p | |
| 335 -- | |
| 336 -- Instead we prove | |
| 337 -- | |
| 338 TransFiniteExists : {n m l : Level} → ( ψ : Ordinal {n} → Set m ) | |
| 165 | 339 → {p : Set l} ( P : { y : Ordinal {n} } → ψ y → ¬ p ) |
| 340 → (exists : ¬ (∀ y → ¬ ( ψ y ) )) | |
| 341 → ¬ p | |
| 166 | 342 TransFiniteExists {n} {m} {l} ψ {p} P = contra-position ( λ p y ψy → P {y} ψy p ) |
| 165 | 343 |