--- /dev/null	Thu Jan 01 00:00:00 1970 +0000
+++ b/src/PFOD.agda	Sat Sep 04 01:43:27 2021 +0900
@@ -0,0 +1,139 @@
+open import Level
+open import Ordinals
+module PFOD {n : Level } (O : Ordinals {n})   where
+
+import filter 
+open import zf
+open import logic
+-- open import partfunc {n} O
+import OD 
+
+open import Relation.Nullary 
+open import Relation.Binary 
+open import Data.Empty 
+open import Relation.Binary
+open import Relation.Binary.Core
+open import Relation.Binary.PropositionalEquality
+open import Data.Nat renaming ( zero to Zero ; suc to Suc ;  ℕ to Nat ; _⊔_ to _n⊔_ ) 
+import BAlgbra 
+
+open BAlgbra O
+
+open inOrdinal O
+open OD O
+open OD.OD
+open ODAxiom odAxiom
+import OrdUtil
+import ODUtil
+open Ordinals.Ordinals  O
+open Ordinals.IsOrdinals isOrdinal
+open Ordinals.IsNext isNext
+open OrdUtil O
+open ODUtil O
+
+
+import ODC
+
+open filter O
+
+open _∧_
+open _∨_
+open Bool
+
+
+open HOD
+
+-------
+--    the set of finite partial functions from ω to 2
+--
+--
+
+open import Data.List hiding (filter)
+open import Data.Maybe 
+
+import OPair
+open OPair O
+
+data Hω2 :  (i : Nat) ( x : Ordinal  ) → Set n where
+  hφ :  Hω2 0 o∅
+  h0 : {i : Nat} {x : Ordinal  } → Hω2 i x  →
+    Hω2 (Suc i) (& (Union ((< nat→ω i , nat→ω 0 >) ,  * x )))
+  h1 : {i : Nat} {x : Ordinal  } → Hω2 i x  →
+    Hω2 (Suc i) (& (Union ((< nat→ω i , nat→ω 1 >) ,  * x )))
+  he : {i : Nat} {x : Ordinal  } → Hω2 i x  →
+    Hω2 (Suc i) x
+
+record  Hω2r (x : Ordinal) : Set n where
+  field
+    count : Nat
+    hω2 : Hω2 count x
+
+open Hω2r
+
+HODω2 :  HOD
+HODω2 = record { od = record { def = λ x → Hω2r x } ; odmax = next o∅ ; <odmax = odmax0 } where
+    P  : (i j : Nat) (x : Ordinal ) → HOD
+    P  i j x = ((nat→ω i , nat→ω i) , (nat→ω i , nat→ω j)) , * x
+    nat1 : (i : Nat) (x : Ordinal) → & (nat→ω i) o< next x
+    nat1 i x =  next< nexto∅ ( <odmax infinite (ω∋nat→ω {i}))
+    lemma1 : (i j : Nat) (x : Ordinal ) → osuc (& (P i j x)) o< next x
+    lemma1 i j x = osuc<nx (pair-<xy (pair-<xy (pair-<xy (nat1 i x) (nat1 i x) ) (pair-<xy (nat1 i x) (nat1 j x) ) )
+         (subst (λ k → k o< next x) (sym &iso) x<nx ))
+    lemma : (i j : Nat) (x : Ordinal ) → & (Union (P i j x)) o< next x
+    lemma i j x = next< (lemma1 i j x ) ho<
+    odmax0 :  {y : Ordinal} → Hω2r y → y o< next o∅ 
+    odmax0 {y} r with hω2 r
+    ... | hφ = x<nx
+    ... | h0 {i} {x} t = next< (odmax0 record { count = i ; hω2 = t }) (lemma i 0 x)
+    ... | h1 {i} {x} t = next< (odmax0 record { count = i ; hω2 = t }) (lemma i 1 x)
+    ... | he {i} {x} t = next< (odmax0 record { count = i ; hω2 = t }) x<nx
+
+3→Hω2 : List (Maybe Two) → HOD
+3→Hω2 t = list→hod t 0 where
+   list→hod : List (Maybe Two) → Nat → HOD
+   list→hod [] _ = od∅
+   list→hod (just i0 ∷ t) i = Union (< nat→ω i , nat→ω 0 > , ( list→hod t (Suc i) )) 
+   list→hod (just i1 ∷ t) i = Union (< nat→ω i , nat→ω 1 > , ( list→hod t (Suc i) )) 
+   list→hod (nothing ∷ t) i = list→hod t (Suc i ) 
+
+Hω2→3 : (x :  HOD) → HODω2 ∋ x → List (Maybe Two) 
+Hω2→3 x = lemma where
+   lemma : { y : Ordinal } →  Hω2r y → List (Maybe Two)
+   lemma record { count = 0 ; hω2 = hφ } = []
+   lemma record { count = (Suc i) ; hω2 = (h0 hω3) } = just i0 ∷ lemma record { count = i ; hω2 =  hω3 }
+   lemma record { count = (Suc i) ; hω2 = (h1 hω3) } = just i1 ∷ lemma record { count = i ; hω2 =  hω3 }
+   lemma record { count = (Suc i) ; hω2 = (he hω3) } = nothing ∷ lemma record { count = i ; hω2 =  hω3 }
+
+ω→2 : HOD
+ω→2 = Power infinite
+
+ω→2f : (x : HOD) → ω→2 ∋ x → Nat → Two
+ω→2f x lt n with ODC.∋-p O x (nat→ω n)
+ω→2f x lt n | yes p = i1
+ω→2f x lt n | no ¬p = i0
+
+fω→2-sel : ( f : Nat → Two ) (x : HOD) → Set n
+fω→2-sel f x = (infinite ∋ x) ∧ ( (lt : odef infinite (&  x) ) → f (ω→nat x lt) ≡ i1 )
+
+fω→2 : (Nat → Two) → HOD
+fω→2 f = Select infinite (fω→2-sel f)
+
+open _==_
+
+import Axiom.Extensionality.Propositional
+postulate f-extensionality : { n m : Level}  → Axiom.Extensionality.Propositional.Extensionality n m
+
+ω2∋f : (f : Nat → Two) → ω→2 ∋ fω→2 f
+ω2∋f f = power← infinite (fω→2 f) (λ {x} lt →  proj1 ((proj2 (selection {fω→2-sel f} {infinite} )) lt))
+
+ω→2f≡i1 : (X i : HOD) → (iω : infinite ∋ i) → (lt : ω→2 ∋ X ) → ω→2f X lt (ω→nat i iω)  ≡ i1 → X ∋ i
+ω→2f≡i1 X i iω lt eq with ODC.∋-p O X (nat→ω (ω→nat i iω))
+ω→2f≡i1 X i iω lt eq | yes p = subst (λ k → X ∋ k ) (nat→ω-iso iω) p
+
+open _⊆_
+
+-- someday ...
+-- postulate 
+--    ω→2f-iso : (X : HOD) → ( lt : ω→2 ∋ X ) → fω→2 ( ω→2f X lt )  =h= X
+--    fω→2-iso : (f : Nat → Two) → ω→2f ( fω→2 f ) (ω2∋f f) ≡ f
+

--- a/src/generic-filter.agda	Mon Dec 21 10:24:10 2020 +0900
+++ b/src/generic-filter.agda	Sat Sep 04 01:43:27 2021 +0900
@@ -54,92 +54,6 @@
 import OPair
 open OPair O
 
-ODSuc : (y : HOD) → infinite ∋ y → HOD
-ODSuc y lt = Union (y , (y , y)) 
-
-data Hω2 :  (i : Nat) ( x : Ordinal  ) → Set n where
-  hφ :  Hω2 0 o∅
-  h0 : {i : Nat} {x : Ordinal  } → Hω2 i x  →
-    Hω2 (Suc i) (& (Union ((< nat→ω i , nat→ω 0 >) ,  * x )))
-  h1 : {i : Nat} {x : Ordinal  } → Hω2 i x  →
-    Hω2 (Suc i) (& (Union ((< nat→ω i , nat→ω 1 >) ,  * x )))
-  he : {i : Nat} {x : Ordinal  } → Hω2 i x  →
-    Hω2 (Suc i) x
-
-record  Hω2r (x : Ordinal) : Set n where
-  field
-    count : Nat
-    hω2 : Hω2 count x
-
-open Hω2r
-
-HODω2 :  HOD
-HODω2 = record { od = record { def = λ x → Hω2r x } ; odmax = next o∅ ; <odmax = odmax0 } where
-    P  : (i j : Nat) (x : Ordinal ) → HOD
-    P  i j x = ((nat→ω i , nat→ω i) , (nat→ω i , nat→ω j)) , * x
-    nat1 : (i : Nat) (x : Ordinal) → & (nat→ω i) o< next x
-    nat1 i x =  next< nexto∅ ( <odmax infinite (ω∋nat→ω {i}))
-    lemma1 : (i j : Nat) (x : Ordinal ) → osuc (& (P i j x)) o< next x
-    lemma1 i j x = osuc<nx (pair-<xy (pair-<xy (pair-<xy (nat1 i x) (nat1 i x) ) (pair-<xy (nat1 i x) (nat1 j x) ) )
-         (subst (λ k → k o< next x) (sym &iso) x<nx ))
-    lemma : (i j : Nat) (x : Ordinal ) → & (Union (P i j x)) o< next x
-    lemma i j x = next< (lemma1 i j x ) ho<
-    odmax0 :  {y : Ordinal} → Hω2r y → y o< next o∅ 
-    odmax0 {y} r with hω2 r
-    ... | hφ = x<nx
-    ... | h0 {i} {x} t = next< (odmax0 record { count = i ; hω2 = t }) (lemma i 0 x)
-    ... | h1 {i} {x} t = next< (odmax0 record { count = i ; hω2 = t }) (lemma i 1 x)
-    ... | he {i} {x} t = next< (odmax0 record { count = i ; hω2 = t }) x<nx
-
-3→Hω2 : List (Maybe Two) → HOD
-3→Hω2 t = list→hod t 0 where
-   list→hod : List (Maybe Two) → Nat → HOD
-   list→hod [] _ = od∅
-   list→hod (just i0 ∷ t) i = Union (< nat→ω i , nat→ω 0 > , ( list→hod t (Suc i) )) 
-   list→hod (just i1 ∷ t) i = Union (< nat→ω i , nat→ω 1 > , ( list→hod t (Suc i) )) 
-   list→hod (nothing ∷ t) i = list→hod t (Suc i ) 
-
-Hω2→3 : (x :  HOD) → HODω2 ∋ x → List (Maybe Two) 
-Hω2→3 x = lemma where
-   lemma : { y : Ordinal } →  Hω2r y → List (Maybe Two)
-   lemma record { count = 0 ; hω2 = hφ } = []
-   lemma record { count = (Suc i) ; hω2 = (h0 hω3) } = just i0 ∷ lemma record { count = i ; hω2 =  hω3 }
-   lemma record { count = (Suc i) ; hω2 = (h1 hω3) } = just i1 ∷ lemma record { count = i ; hω2 =  hω3 }
-   lemma record { count = (Suc i) ; hω2 = (he hω3) } = nothing ∷ lemma record { count = i ; hω2 =  hω3 }
-
-ω→2 : HOD
-ω→2 = Power infinite
-
-ω→2f : (x : HOD) → ω→2 ∋ x → Nat → Two
-ω→2f x lt n with ODC.∋-p O x (nat→ω n)
-ω→2f x lt n | yes p = i1
-ω→2f x lt n | no ¬p = i0
-
-fω→2-sel : ( f : Nat → Two ) (x : HOD) → Set n
-fω→2-sel f x = (infinite ∋ x) ∧ ( (lt : odef infinite (&  x) ) → f (ω→nat x lt) ≡ i1 )
-
-fω→2 : (Nat → Two) → HOD
-fω→2 f = Select infinite (fω→2-sel f)
-
-open _==_
-
-import Axiom.Extensionality.Propositional
-postulate f-extensionality : { n m : Level}  → Axiom.Extensionality.Propositional.Extensionality n m
-
-ω2∋f : (f : Nat → Two) → ω→2 ∋ fω→2 f
-ω2∋f f = power← infinite (fω→2 f) (λ {x} lt →  proj1 ((proj2 (selection {fω→2-sel f} {infinite} )) lt))
-
-ω→2f≡i1 : (X i : HOD) → (iω : infinite ∋ i) → (lt : ω→2 ∋ X ) → ω→2f X lt (ω→nat i iω)  ≡ i1 → X ∋ i
-ω→2f≡i1 X i iω lt eq with ODC.∋-p O X (nat→ω (ω→nat i iω))
-ω→2f≡i1 X i iω lt eq | yes p = subst (λ k → X ∋ k ) (nat→ω-iso iω) p
-
-open _⊆_
-
--- someday ...
--- postulate 
---    ω→2f-iso : (X : HOD) → ( lt : ω→2 ∋ X ) → fω→2 ( ω→2f X lt )  =h= X
---    fω→2-iso : (f : Nat → Two) → ω→2f ( fω→2 f ) (ω2∋f f) ≡ f
-
 record CountableOrdinal : Set (suc (suc n)) where
    field
        ctl→ : Nat → Ordinal
@@ -170,19 +84,19 @@
    ; odmax = odmax (Power P)  ; <odmax = λ {y} lt → <odmax (Power P) (proj1 lt) }  
 
 ---
---   p(n+1) = if PGHOD n qn otherwise p(n)
+--   p(n+1) = if (f n) then qn otherwise p(n)
 --
-next-p :  (C : CountableOrdinal) (P : HOD ) (i : Nat) → (p : Ordinal) → Ordinal
-next-p C P i p with is-o∅  ( & (PGHOD i C P p))  
-next-p C P i p | yes y = p
-next-p C P i p | no not = & (ODC.minimal O (PGHOD i C P p ) (λ eq → not (=od∅→≡o∅ eq)))  -- axiom of choice
+next-p :  (p : Ordinal) → (f : HOD → HOD) → Ordinal
+next-p p f with is-o∅  ( & (f (* p)))  
+next-p p f | yes y = p
+next-p p f | no not = & (ODC.minimal O (f (* p) ) (λ eq → not (=od∅→≡o∅ eq)))  -- axiom of choice
 
 ---
 --  ascendant search on p(n)
 --
 find-p :  (C : CountableOrdinal) (P : HOD ) (i : Nat) → (x : Ordinal) → Ordinal
 find-p C P Zero x = x
-find-p C P (Suc i) x = find-p C P i ( next-p C P i x )
+find-p C P (Suc i) x = find-p C P i ( next-p x (λ p → PGHOD i C P (& p) ))
 
 ---
 -- G = { r ∈ Power P | ∃ n → r ⊆ p(n) }
@@ -218,6 +132,8 @@
 x<y→∋ : {x y : Ordinal} → odef (* x) y → * x ∋ * y
 x<y→∋ {x} {y} lt = subst (λ k → odef (* x) k ) (sym &iso) lt
 
+open _⊆_
+
 P-GenericFilter : (C : CountableOrdinal) → (P : HOD ) → GenericFilter P
 P-GenericFilter C P = record {
       genf = record { filter = PDHOD C P ; f⊆PL =  f⊆PL ; filter1 = {!!} ; filter2 = {!!} }
@@ -226,7 +142,7 @@
         find-p-⊆P : (C : CountableOrdinal) (P : HOD ) (i : Nat) → (x y : Ordinal)  → odef (Power P) x → odef (* (find-p C P i x)) y → odef P y 
         find-p-⊆P C P Zero x y Px Py = subst (λ k → odef P k ) &iso
             ( incl (ODC.power→⊆ O P (* x) (d→∋ (Power P)  Px)) (x<y→∋ Py))
-        find-p-⊆P C P (Suc i) x y Px Py = find-p-⊆P C P i (next-p C P i x)  y {!!} {!!}
+        find-p-⊆P C P (Suc i) x y Px Py = find-p-⊆P C P i (next-p x (λ p → PGHOD i C P (& p)))   y {!!} {!!}
         f⊆PL :  PDHOD C P ⊆ Power P
         f⊆PL = record { incl = λ {x} lt → power← P x (λ {y} y<x →
              find-p-⊆P C P (gr lt) o∅ (& y) P∅ (pn<gr lt (& y) (subst (λ k → odef k (& y)) (sym *iso) y<x))) }
@@ -246,6 +162,13 @@
     →  Incompatible P → ¬ ( mhod M ∋ filter ( genf ( P-GenericFilter C P )))
 lemma725 = {!!}
 
+open import PFOD O
+
+-- HODω2 : HOD
+-- 
+-- ω→2 : HOD
+-- ω→2 = Power infinite
+
 lemma725-1 :   Incompatible HODω2
 lemma725-1 = {!!}