Mercurial > hg > Members > kono > Proof > ZF-in-agda
annotate cardinal.agda @ 228:49736efc822b
try transfinite
author | Shinji KONO <kono@ie.u-ryukyu.ac.jp> |
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date | Sun, 11 Aug 2019 20:42:48 +0900 |
parents | a4cdfc84f65f |
children | 5e36744b8dce |
rev | line source |
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16 | 1 open import Level |
224 | 2 open import Ordinals |
3 module cardinal {n : Level } (O : Ordinals {n}) where | |
3 | 4 |
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separete constructible set
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5 open import zf |
219 | 6 open import logic |
224 | 7 import OD |
23 | 8 open import Data.Nat renaming ( zero to Zero ; suc to Suc ; ℕ to Nat ; _⊔_ to _n⊔_ ) |
224 | 9 open import Relation.Binary.PropositionalEquality |
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10 open import Data.Nat.Properties |
6 | 11 open import Data.Empty |
12 open import Relation.Nullary | |
13 open import Relation.Binary | |
14 open import Relation.Binary.Core | |
15 | |
224 | 16 open inOrdinal O |
17 open OD O | |
219 | 18 open OD.OD |
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posturate OD is isomorphic to Ordinal
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19 |
120 | 20 open _∧_ |
213
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21 open _∨_ |
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22 open Bool |
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od→lv : {n : Level} → OD {n} → Nat
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23 |
225 | 24 |
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25 func : (f : Ordinal → Ordinal ) → ( dom : OD ) → OD |
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26 func f dom = Replace dom ( λ x → x , (ord→od (f (od→ord x) ))) |
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27 |
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28 record _⊗_ (A B : Ordinal) : Set n where |
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29 field |
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30 π1 : Ordinal |
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31 π2 : Ordinal |
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32 A∋π1 : def (ord→od A) π1 |
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33 B∋π2 : def (ord→od B) π2 |
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34 |
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35 Func : ( A B : OD ) → OD |
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36 Func A B = record { def = λ x → (od→ord A) ⊗ (od→ord B) } |
225 | 37 |
226
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38 π1 : { A B x : OD } → Func A B ∋ x → OD |
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39 π1 {A} {B} {x} p = ord→od (_⊗_.π1 p) |
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40 |
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41 π2 : { A B x : OD } → Func A B ∋ x → OD |
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42 π2 {A} {B} {x} p = ord→od (_⊗_.π2 p) |
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43 |
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44 Func→func : { dom cod : OD } → (f : OD ) → Func dom cod ∋ f → (Ordinal → Ordinal ) |
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45 Func→func {dom} {cod} f lt x = sup-o ( λ y → lemma y ) where |
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46 lemma : Ordinal → Ordinal |
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47 lemma y with p∨¬p ( _⊗_.π1 lt ≡ x ) |
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48 lemma y | case1 refl = _⊗_.π2 lt |
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49 lemma y | case2 not = o∅ |
225 | 50 |
227 | 51 -- contra position of sup-o< |
52 -- | |
53 | |
228 | 54 postulate |
55 -- contra-position of mimimulity of supermum required in Cardinal | |
56 sup-x : ( Ordinal → Ordinal ) → Ordinal | |
57 sup-lb : { ψ : Ordinal → Ordinal } → {z : Ordinal } → z o< sup-o ψ → z o< osuc (ψ (sup-x ψ)) | |
227 | 58 |
219 | 59 ------------ |
60 -- | |
61 -- Onto map | |
62 -- def X x -> xmap | |
63 -- X ---------------------------> Y | |
64 -- ymap <- def Y y | |
65 -- | |
224 | 66 record Onto (X Y : OD ) : Set n where |
219 | 67 field |
226
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68 xmap : Ordinal |
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69 ymap : Ordinal |
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70 xfunc : def (Func X Y) xmap |
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71 yfunc : def (Func Y X) ymap |
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72 onto-iso : {y : Ordinal } → (lty : def Y y ) → Func→func (ord→od xmap) xfunc ( Func→func (ord→od ymap) yfunc y ) ≡ y |
51 | 73 |
224 | 74 record Cardinal (X : OD ) : Set n where |
219 | 75 field |
224 | 76 cardinal : Ordinal |
219 | 77 conto : Onto (Ord cardinal) X |
224 | 78 cmax : ( y : Ordinal ) → cardinal o< y → ¬ Onto (Ord y) X |
151 | 79 |
224 | 80 cardinal : (X : OD ) → Cardinal X |
81 cardinal X = record { | |
219 | 82 cardinal = sup-o ( λ x → proj1 ( cardinal-p x) ) |
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83 ; conto = onto |
219 | 84 ; cmax = cmax |
85 } where | |
224 | 86 cardinal-p : (x : Ordinal ) → ( Ordinal ∧ Dec (Onto (Ord x) X) ) |
219 | 87 cardinal-p x with p∨¬p ( Onto (Ord x) X ) |
88 cardinal-p x | case1 True = record { proj1 = x ; proj2 = yes True } | |
89 cardinal-p x | case2 False = record { proj1 = o∅ ; proj2 = no False } | |
228 | 90 lemma1 : (x : Ordinal) → ((y : Ordinal) → y o< x → Lift (suc n) (y o< (osuc (sup-o (λ x₁ → proj1 (cardinal-p x₁)))) → Onto (Ord y) X)) → |
91 Lift (suc n) (x o< (osuc (sup-o (λ x₁ → proj1 (cardinal-p x₁)))) → Onto (Ord x) X) | |
92 lemma1 = {!!} | |
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93 onto : Onto (Ord (sup-o (λ x → proj1 (cardinal-p x)))) X |
228 | 94 onto with TransFinite {λ x → Lift (suc n) ( x o< osuc (sup-o (λ x → proj1 (cardinal-p x))) → Onto (Ord x) X ) } lemma1 (sup-o (λ x → proj1 (cardinal-p x))) |
95 ... | lift t = t <-osuc where | |
219 | 96 cmax : (y : Ordinal) → sup-o (λ x → proj1 (cardinal-p x)) o< y → ¬ Onto (Ord y) X |
224 | 97 cmax y lt ontoy = o<> lt (o<-subst {_} {_} {y} {sup-o (λ x → proj1 (cardinal-p x))} |
98 (sup-o< {λ x → proj1 ( cardinal-p x)}{y} ) lemma refl ) where | |
219 | 99 lemma : proj1 (cardinal-p y) ≡ y |
100 lemma with p∨¬p ( Onto (Ord y) X ) | |
101 lemma | case1 x = refl | |
102 lemma | case2 not = ⊥-elim ( not ontoy ) | |
217 | 103 |
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104 |
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105 ----- |
219 | 106 -- All cardinal is ℵ0, since we are working on Countable Ordinal, |
107 -- Power ω is larger than ℵ0, so it has no cardinal. | |
218 | 108 |
109 | |
110 |