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1 {-# OPTIONS --allow-unsolved-metas #-}
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2 open import Level
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3 open import Ordinals
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4 import OD
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5 module zorn {n : Level } (O : Ordinals {n}) (_<_ : (x y : OD.HOD O ) → Set n ) where
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6
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7 open import zf
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8 open import logic
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9 -- open import partfunc {n} O
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10
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11 open import Relation.Nullary
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12 open import Relation.Binary
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13 open import Data.Empty
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14 open import Relation.Binary
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15 open import Relation.Binary.Core
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16 open import Relation.Binary.PropositionalEquality
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17 import BAlgbra
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18
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19
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20 open inOrdinal O
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21 open OD O
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22 open OD.OD
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23 open ODAxiom odAxiom
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24 import OrdUtil
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25 import ODUtil
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26 open Ordinals.Ordinals O
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27 open Ordinals.IsOrdinals isOrdinal
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28 open Ordinals.IsNext isNext
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29 open OrdUtil O
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30 open ODUtil O
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31
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32
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33 import ODC
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34
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35
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36 open _∧_
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37 open _∨_
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38 open Bool
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39
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40
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41 open HOD
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42
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43 record Element (A : HOD) : Set (suc n) where
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44 field
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45 elm : HOD
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46 is-elm : A ∋ elm
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47
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48 open Element
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49
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50 IsPartialOrderSet : ( A : HOD ) → Set (suc n)
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51 IsPartialOrderSet A = IsStrictPartialOrder _≡A_ _<A_ where
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52 _<A_ : (x y : Element A ) → Set n
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53 x <A y = elm x < elm y
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54 _≡A_ : (x y : Element A ) → Set (suc n)
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55 x ≡A y = elm x ≡ elm y
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56
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57 open _==_
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58 open _⊆_
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59
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60 isA : { A B : HOD } → B ⊆ A → (x : Element B) → Element A
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61 isA B⊆A x = record { elm = elm x ; is-elm = incl B⊆A (is-elm x) }
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62
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63 ⊆-IsPartialOrderSet : { A B : HOD } → B ⊆ A → IsPartialOrderSet A → IsPartialOrderSet B
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64 ⊆-IsPartialOrderSet {A} {B} B⊆A PA = record {
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65 isEquivalence = record { refl = refl ; sym = sym ; trans = trans } ; trans = λ {x} {y} {z} → trans1 {x} {y} {z}
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66 ; irrefl = λ {x} {y} → irrefl1 {x} {y} ; <-resp-≈ = resp0
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67 } where
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68 _<B_ : (x y : Element B ) → Set n
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69 x <B y = elm x < elm y
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70 trans1 : {x y z : Element B} → x <B y → y <B z → x <B z
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71 trans1 {x} {y} {z} x<y y<z = IsStrictPartialOrder.trans PA {isA B⊆A x} {isA B⊆A y} {isA B⊆A z} x<y y<z
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72 irrefl1 : {x y : Element B} → elm x ≡ elm y → ¬ ( x <B y )
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73 irrefl1 {x} {y} x=y x<y = IsStrictPartialOrder.irrefl PA {isA B⊆A x} {isA B⊆A y} x=y x<y
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74 open import Data.Product
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75 resp0 : ({x y z : Element B} → elm y ≡ elm z → x <B y → x <B z) × ({x y z : Element B} → elm y ≡ elm z → y <B x → z <B x)
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76 resp0 = Data.Product._,_ (λ {x} {y} {z} → proj₁ (IsStrictPartialOrder.<-resp-≈ PA) {isA B⊆A x } {isA B⊆A y }{isA B⊆A z })
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77 (λ {x} {y} {z} → proj₂ (IsStrictPartialOrder.<-resp-≈ PA) {isA B⊆A x } {isA B⊆A y }{isA B⊆A z })
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78
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79 -- open import Relation.Binary.Properties.Poset as Poset
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80
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81 IsTotalOrderSet : ( A : HOD ) → Set (suc n)
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82 IsTotalOrderSet A = IsStrictTotalOrder _≡A_ _<A_ where
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83 _<A_ : (x y : Element A ) → Set n
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84 x <A y = elm x < elm y
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85 _≡A_ : (x y : Element A ) → Set (suc n)
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86 x ≡A y = elm x ≡ elm y
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87
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88 me : { A a : HOD } → A ∋ a → Element A
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89 me {A} {a} lt = record { elm = a ; is-elm = lt }
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90
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91 record SUP ( A B : HOD ) : Set (suc n) where
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92 field
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93 sup : HOD
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94 A∋maximal : A ∋ sup
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95 x<sup : {x : HOD} → B ∋ x → (x ≡ sup ) ∨ (x < sup ) -- B is Total, use positive
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96
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97 record Maximal ( A : HOD ) : Set (suc n) where
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98 field
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99 maximal : HOD
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100 A∋maximal : A ∋ maximal
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101 ¬maximal<x : {x : HOD} → A ∋ x → ¬ maximal < x -- A is Partial, use negative
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102
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103 record ZChain ( A : HOD ) (y : Ordinal) : Set (suc n) where
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104 field
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105 max : HOD
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106 A∋max : A ∋ max
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107 y<max : y o< & max
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108 chain : HOD
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109 chain⊆A : chain ⊆ A
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110 total : IsTotalOrderSet chain
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111 chain-max : (x : HOD) → chain ∋ x → (x ≡ max ) ∨ ( x < max )
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112
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113 data IChain (A : HOD) : Ordinal → Set n where
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114 ifirst : {ox : Ordinal} → odef A ox → IChain A ox
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115 inext : {ox oy : Ordinal} → odef A oy → * ox < * oy → IChain A ox → IChain A oy
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116
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117 ic-connet : {A : HOD} {x : Ordinal} → (x : IChain A x) → Ordinal → Set n
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118 ic-connet {A} (ifirst {ox} ax) oy = ox ≡ oy
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119 ic-connet {A} (inext {ox} {oy} ay x<y iy) oz = (ox ≡ oz) ∨ ic-connet iy oz
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120
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121 IChainSet : {A : HOD} → Element A → HOD
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122 IChainSet {A} ax = record { od = record { def = λ y → odef A y ∧ ( (iy : IChain A y ) → ic-connet iy (& (elm ax))) }
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123 ; odmax = & A ; <odmax = λ {y} lt → subst (λ k → k o< & A) &iso (c<→o< (subst (λ k → odef A k) (sym &iso) (proj1 lt))) }
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124
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125 -- there is a y, & y > & x
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126
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127 record OSup> (A : HOD) {x : Ordinal} (ax : A ∋ * x) : Set n where
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128 field
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129 y : Ordinal
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130 icy : odef (IChainSet {A} (me ax)) y
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131 y>x : x o< y
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132
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133 -- finite IChain
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134
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135 record InFiniteIChain (A : HOD) {x : Ordinal} (ax : A ∋ * x) : Set n where
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136 field
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137 chain<x : (y : Ordinal ) → odef (IChainSet {A} (me ax)) y → y o< x
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138 c-infinite : (y : Ordinal ) → (cy : odef (IChainSet {A} (me ax)) y )
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139 → OSup> (IChainSet {A} (me ax)) (d→∋ (IChainSet {A} (me ax)) cy)
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140
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141 record IsFC (A : HOD) {x : Ordinal} (ax : A ∋ * x) (y : Ordinal) : Set n where
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142 field
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143 icy : odef (IChainSet {A} (me ax)) y
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144 c-finite : ¬ OSup> (IChainSet {A} (me ax)) (d→∋ (IChainSet {A} (me ax)) icy)
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145
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146 Zorn-lemma-case : { A : HOD }
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147 → o∅ o< & A
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148 → IsPartialOrderSet A
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149 → (x : Element A) → OSup> A (d→∋ A (is-elm x)) ∨ Maximal A ∨ InFiniteIChain A (d→∋ A (is-elm x))
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150 Zorn-lemma-case {A} 0<A PO x = zc2 where
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151 Gtx : HOD
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152 Gtx = record { od = record { def = λ y → odef ( IChainSet x ) y ∧ ( & (elm x) o< y ) } ; odmax = & A
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153 ; <odmax = λ lt → subst (λ k → k o< & A) &iso (c<→o< (d→∋ A (proj1 (proj1 lt)))) }
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154 HG : HOD
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155 HG = record { od = record { def = λ y → odef A y ∧ IsFC A (d→∋ A (is-elm x) ) y } ; odmax = & A
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156 ; <odmax = λ lt → subst (λ k → k o< & A) &iso (c<→o< (d→∋ A (proj1 lt) )) }
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157 zc2 : OSup> A (d→∋ A (is-elm x)) ∨ Maximal A ∨ InFiniteIChain A (d→∋ A (is-elm x))
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158 zc2 with is-o∅ (& Gtx)
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159 ... | no nogt = case1 {!!}
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160 ... | yes nogt with is-o∅ (& HG)
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161 ... | no nohg = case2 (case1 {!!} )
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162 ... | yes nohg = case2 (case2 {!!} )
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163
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164
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165 Zorn-lemma : { A : HOD }
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166 → o∅ o< & A
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167 → IsPartialOrderSet A
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168 → ( ( B : HOD) → (B⊆A : B ⊆ A) → IsTotalOrderSet B → SUP A B ) -- SUP condition
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169 → Maximal A
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170 Zorn-lemma {A} 0<A PO supP = zorn00 where
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171 someA : HOD
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172 someA = ODC.minimal O A (λ eq → ¬x<0 ( subst (λ k → o∅ o< k ) (=od∅→≡o∅ eq) 0<A ))
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173 isSomeA : A ∋ someA
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174 isSomeA = ODC.x∋minimal O A (λ eq → ¬x<0 ( subst (λ k → o∅ o< k ) (=od∅→≡o∅ eq) 0<A ))
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175 HasMaximal : HOD
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176 HasMaximal = record { od = record { def = λ y → odef A y ∧ ((m : Ordinal) → odef A m → ¬ (* y < * m))} ; odmax = & A ; <odmax = z08 } where
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177 z08 : {y : Ordinal} → (odef A y ∧ ((m : Ordinal) → odef A m → ¬ (* y < * m))) → y o< & A
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178 z08 {y} P = subst (λ k → k o< & A) &iso (c<→o< {* y} (subst (λ k → odef A k) (sym &iso) (proj1 P)))
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179 no-maximal : HasMaximal =h= od∅ → (y : Ordinal) → (odef A y ∧ ((m : Ordinal) → odef A m → ¬ (* y < * m))) → ⊥
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180 no-maximal nomx y P = ¬x<0 (eq→ nomx {y} ⟪ proj1 P , (λ m am → (proj2 P) m am ) ⟫ )
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181 Gtx : { x : HOD} → A ∋ x → HOD
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182 Gtx {x} ax = record { od = record { def = λ y → odef A y ∧ (x < (* y)) } ; odmax = & A ; <odmax = z09 } where
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183 z09 : {y : Ordinal} → (odef A y ∧ (x < (* y))) → y o< & A
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184 z09 {y} P = subst (λ k → k o< & A) &iso (c<→o< {* y} (subst (λ k → odef A k) (sym &iso) (proj1 P)))
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185 z01 : {a b : HOD} → A ∋ a → A ∋ b → (a ≡ b ) ∨ (a < b ) → b < a → ⊥
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186 z01 {a} {b} A∋a A∋b (case1 a=b) b<a = IsStrictPartialOrder.irrefl PO {me A∋b} {me A∋a} (sym a=b) b<a
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187 z01 {a} {b} A∋a A∋b (case2 a<b) b<a = IsStrictPartialOrder.irrefl PO {me A∋b} {me A∋b} refl (IsStrictPartialOrder.trans PO {me A∋b} {me A∋a} {me A∋b} b<a a<b)
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188 -- ZChain is not compatible with the SUP condition
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189 record BX (x y : Ordinal) (fb : ( x : Ordinal ) → HOD ) : Set n where
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190 field
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191 bx : Ordinal
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192 bx<y : bx o< y
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193 is-fb : x ≡ & (fb bx )
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194 bx<A : (z : ZChain A (& A) ) → {x : Ordinal } → (bx : BX x (& A) {!!}) → BX.bx bx o< & A
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195 bx<A z {x} bx = BX.bx<y bx
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196 z12 : (z : ZChain A (& A) ) → {y : Ordinal} → BX y (& A) {!!} → y o< & A
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197 z12 z {y} bx = subst (λ k → k o< & A) (sym (BX.is-fb bx)) (c<→o< {!!})
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198 B : (z : ZChain A (& A) ) → HOD
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199 B z = {!!}
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200 z11 : (z : ZChain A (& A) ) → (x : Element (B z)) → elm x ≡ {!!}
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201 z11 z x = subst₂ (λ j k → j ≡ k ) *iso *iso ( cong (*) (BX.is-fb (is-elm x)) )
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202 obx : (z : ZChain A (& A) ) → {x : HOD} → B z ∋ x → Ordinal
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203 obx z {x} bx = BX.bx bx
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204 obx=fb : (z : ZChain A (& A) ) → {x : HOD} → (bx : B z ∋ x ) → x ≡ {!!}
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205 obx=fb z {x} bx = subst₂ (λ j k → j ≡ k ) *iso *iso (cong (*) (BX.is-fb bx))
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206 B⊆A : (z : ZChain A (& A) ) → B z ⊆ A
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207 B⊆A z = record { incl = λ {x} bx → subst (λ k → odef A k ) (sym (BX.is-fb bx)) {!!} }
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208 -- PO-B : (z : ZChain A (& A) ) → IsPartialOrderSet (B z) _<_
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209 -- PO-B z = ⊆-IsPartialOrderSet (B⊆A z) PO
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210 bx-monotonic : (z : ZChain A (& A) ) → {x y : Element (B z)} → obx z (is-elm x) o< obx z (is-elm y) → elm x < elm y
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211 bx-monotonic z {x} {y} a = subst₂ (λ j k → j < k ) (sym (z11 z x)) (sym (z11 z y)) {!!}
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212 bcmp : (z : ZChain A (& A) ) → Trichotomous (λ (x : Element (B z)) y → elm x ≡ elm y ) (λ x y → elm x < elm y )
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213 bcmp z x y with trio< (obx z (is-elm x)) (obx z (is-elm y))
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214 ... | tri< a ¬b ¬c = tri< z15 (λ eq → z01 (incl (B⊆A z) (is-elm y)) (incl (B⊆A z) (is-elm x))(case1 (sym eq)) z15 ) z17 where
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215 z15 : elm x < elm y
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216 z15 = bx-monotonic z {x} {y} a
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217 z17 : elm y < elm x → ⊥
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218 z17 lt = z01 (incl (B⊆A z) (is-elm y)) (incl (B⊆A z) (is-elm x))(case2 lt) z15
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219 ... | tri≈ ¬a b ¬c = tri≈ (IsStrictPartialOrder.irrefl PO {isA (B⊆A z) x} {isA (B⊆A z) y} z14) z14 z16 where
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220 z14 : elm x ≡ elm y
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221 z14 = {!!}
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222 z16 = IsStrictPartialOrder.irrefl PO {isA (B⊆A z) y} {isA (B⊆A z) x} (sym z14)
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223 ... | tri> ¬a ¬b c = tri> z17 (λ eq → z01 (incl (B⊆A z) (is-elm x)) (incl (B⊆A z) (is-elm y))(case1 eq) z15 ) z15 where
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224 z15 : elm y < elm x
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225 z15 = bx-monotonic z {y} {x} c
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226 z17 : elm x < elm y → ⊥
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227 z17 lt = z01 (incl (B⊆A z) (is-elm x)) (incl (B⊆A z) (is-elm y))(case2 lt) z15
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228 B-is-total : (z : ZChain A (& A) ) → IsTotalOrderSet (B z)
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229 B-is-total zc = record { isEquivalence = record { refl = refl ; sym = sym ; trans = trans }
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230 ; trans = λ {x} {y} {z} x<y y<z → IsStrictPartialOrder.trans PO {isA (B⊆A zc) x} {isA (B⊆A zc) y} {isA (B⊆A zc) z} x<y y<z
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231 ; compare = bcmp zc }
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232 ind : (x : Ordinal) → ((y : Ordinal) → y o< x → ZChain A y ∨ Maximal A )
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233 → ZChain A x ∨ Maximal A
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234 -- has previous ordinal
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235 -- has maximal use this
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236 -- else has chain
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237 -- & A < y A is a counter example of assumption
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238 -- chack y is maximal
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239 -- y < max use previous chain
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240 -- y = max ( y > max cannot happen )
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241 -- ¬ A ∋ y use previous chain
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242 -- A ∋ y is use oridinaly min of y or previous
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243 -- y is limit ordinal
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244 -- has maximal in some lower use this
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245 -- no maximal in all lower
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246 -- & A < y A is a counter example of assumption
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247 -- A ∋ y is maximal use this
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248 -- ¬ A ∋ y use previous chain
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249 -- check some y ≤ max
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250 -- if none A < y is the counter example
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251 -- else use the ordinaly smallest max as next chain
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252 ind x prev with Oprev-p x
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253 ... | yes op with ODC.∋-p O A (* x)
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254 ... | no ¬Ax = zc1 where
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255 -- we have previous ordinal and ¬ A ∋ x, use previous Zchain
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256 px = Oprev.oprev op
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257 zc1 : ZChain A x ∨ Maximal A
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258 zc1 with prev px (subst (λ k → px o< k) (Oprev.oprev=x op) <-osuc)
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259 ... | case2 x = case2 x -- we have the Maximal
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260 ... | case1 z with trio< x (& (ZChain.max z))
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261 ... | tri< a ¬b ¬c = case1 record { max = ZChain.max z ; y<max = a }
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262 ... | tri≈ ¬a b ¬c = {!!} -- x = max so ¬ A ∋ max
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263 ... | tri> ¬a ¬b c = {!!} -- can't happen
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264 ... | yes ax = zc1 where -- we have previous ordinal and A ∋ x
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265 px = Oprev.oprev op
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266 zc1 : ZChain A x ∨ Maximal A
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267 zc1 with prev px (subst (λ k → px o< k) (Oprev.oprev=x op) <-osuc)
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268 ... | case2 x = case2 x
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269 ... | case1 x with is-o∅ ( & (Gtx ax ))
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270 ... | yes no-sup = case2 {!!}
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271 ... | no sup = case1 {!!}
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272 ind x prev | no ¬ox with trio< (& A) x --- limit ordinal case
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273 ... | tri< a ¬b ¬c = {!!} where
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274 zc1 : ZChain A (& A)
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275 zc1 with prev (& A) a
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276 ... | t = {!!}
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277 ... | tri≈ ¬a b ¬c = {!!} where
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278 ... | tri> ¬a ¬b c with ODC.∋-p O A (* x)
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279 ... | no ¬Ax = {!!} where
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280 ... | yes ax with is-o∅ (& (Gtx ax))
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281 ... | yes nogt = ⊥-elim {!!} where -- no larger element, so it is maximal
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282 x-is-maximal : (m : Ordinal) → odef A m → ¬ (* x < * m)
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283 x-is-maximal m am = ¬x<m where
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284 ¬x<m : ¬ (* x < * m)
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285 ¬x<m x<m = ∅< {Gtx ax} {* m} ⟪ subst (λ k → odef A k) (sym &iso) am , subst (λ k → * x < k ) (cong (*) (sym &iso)) x<m ⟫ (≡o∅→=od∅ nogt)
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286 ... | no not = {!!} where
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287 zorn03 : (x : Ordinal) → ZChain A x ∨ Maximal A
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288 zorn03 x with TransFinite ind x
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289 ... | t = {!!}
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|
290 zorn04 : Maximal A
|
|
291 zorn04 with zorn03 (& A)
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|
292 ... | case1 chain = {!!}
|
|
293 ... | case2 m = m
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|
294 zorn00 : Maximal A
|
467
|
295 zorn00 with is-o∅ ( & HasMaximal )
|
493
|
296 ... | no not = record { maximal = ODC.minimal O HasMaximal (λ eq → not (=od∅→≡o∅ eq)) ; A∋maximal = zorn01 ; ¬maximal<x = zorn02 } where
|
478
|
297 -- yes we have the maximal
|
483
|
298 hasm : odef HasMaximal ( & ( ODC.minimal O HasMaximal (λ eq → not (=od∅→≡o∅ eq)) ) )
|
|
299 hasm = ODC.x∋minimal O HasMaximal (λ eq → not (=od∅→≡o∅ eq))
|
477
|
300 zorn01 : A ∋ ODC.minimal O HasMaximal (λ eq → not (=od∅→≡o∅ eq))
|
483
|
301 zorn01 = proj1 hasm
|
493
|
302 zorn02 : {x : HOD} → A ∋ x → ¬ (ODC.minimal O HasMaximal (λ eq → not (=od∅→≡o∅ eq)) < x)
|
|
303 zorn02 {x} ax m<x = ((proj2 hasm) (& x) ax) (subst₂ (λ j k → j < k) (sym *iso) (sym *iso) m<x )
|
497
|
304 ... | yes ¬Maximal = {!!} where
|
478
|
305 -- if we have no maximal, make ZChain, which contradict SUP condition
|
497
|
306 z : (x : Ordinal) → HasMaximal =h= od∅ → ZChain A x ∨ Maximal A
|
|
307 z x nomx with TransFinite {!!} x
|
|
308 ... | t = {!!}
|
464
|
309
|
497
|
310 -- _⊆'_ : ( A B : HOD ) → Set n
|
|
311 -- _⊆'_ A B = (x : Ordinal ) → odef A x → odef B x
|
482
|
312
|
497
|
313 -- MaximumSubset : {L P : HOD}
|
|
314 -- → o∅ o< & L → o∅ o< & P → P ⊆ L
|
|
315 -- → IsPartialOrderSet P _⊆'_
|
|
316 -- → ( (B : HOD) → B ⊆ P → IsTotalOrderSet B _⊆'_ → SUP P B _⊆'_ )
|
|
317 -- → Maximal P (_⊆'_)
|
|
318 -- MaximumSubset {L} {P} 0<L 0<P P⊆L PO SP = Zorn-lemma {P} {_⊆'_} 0<P PO SP
|