+notation < "term 90 U \sub (term 90 x)" non associative with precedence 50 for @{ 'famU $U $x }.
+notation > "U ⎽ term 90 x" non associative with precedence 50 for @{ 'famU $U $x }.
+
+interpretation "famU" 'famU U x = (famU ? U x).
+
+ndefinition ord_coverage : ∀A:nAx.∀U:Ω^A.Ω^A ≝ λA,U.{ y | ∃x:Ord A. y ∈ famU ? U x }.
+
+ndefinition ord_cover_set ≝ λc:∀A:nAx.Ω^A → Ω^A.λA,C,U.
+ ∀y.y ∈ C → y ∈ c A U.
+
+interpretation "coverage new cover" 'coverage U = (ord_coverage ? U).
+interpretation "new covers set" 'covers a U = (ord_cover_set ord_coverage ? a U).
+interpretation "new covers" 'covers a U = (mem ? (ord_coverage ? U) a).
+
+ntheorem new_coverage_reflexive:
+ ∀A:nAx.∀U:Ω^A.∀a. a ∈ U → a ◃ U.
+#A; #U; #a; #H; @ (oO A); napply H;
+nqed.
+
+nlemma ord_subset:
+ ∀A:nAx.∀a:A.∀i,f,U.∀j:𝐃 a i.U⎽(f j) ⊆ U⎽(Λ f).
+#A; #a; #i; #f; #U; #j; #b; #bUf; @ j; nassumption;
+nqed.
+
+naxiom AC : ∀A,a,i,U.(∀j:𝐃 a i.∃x:Ord A.𝐝 a i j ∈ U⎽x) → (Σf.∀j:𝐃 a i.𝐝 a i j ∈ U⎽(f j)).
+
+naxiom setoidification :
+ ∀A:nAx.∀a,b:A.∀U.a=b → b ∈ U → a ∈ U.
+
+(*DOCBEGIN
+
+Bla Bla,
+
+
+DOCEND*)
+
+alias symbol "covers" = "new covers".
+alias symbol "covers" = "new covers set".
+alias symbol "covers" = "new covers".
+alias symbol "covers" = "new covers set".
+alias symbol "covers" = "new covers".
+alias symbol "covers" = "new covers set".
+alias symbol "covers" = "new covers".
+alias symbol "covers" = "new covers set".
+alias symbol "covers" = "new covers".
+ntheorem new_coverage_infinity:
+ ∀A:nAx.∀U:Ω^A.∀a:A. (∃i:𝐈 a. 𝐈𝐦[𝐝 a i] ◃ U) → a ◃ U.
+#A; #U; #a;(** screenshot "figure1". *)
+*; #i; #H; nnormalize in H;
+ncut (∀y:𝐃 a i.∃x:Ord A.𝐝 a i y ∈ U⎽x); ##[
+ #y; napply H; @ y; napply #; ##] #H';
+ncases (AC … H'); #f; #Hf;
+ncut (∀j.𝐝 a i j ∈ U⎽(Λ f));
+ ##[ #j; napply (ord_subset … f … (Hf j));##] #Hf';
+@ ((Λ f)+1); @2; nwhd; @i; #x; *; #d; #Hd;
+napply (setoidification … Hd); napply Hf';
+nqed.
+
+nlemma new_coverage_min :
+ ∀A:nAx.∀U:qpowerclass A.∀V.U ⊆ V → (∀a:A.∀i.𝐈𝐦[𝐝 a i] ⊆ V → a ∈ V) → ◃(pc ? U) ⊆ V.
+#A; #U; #V; #HUV; #Im; #b; *; #o; ngeneralize in match b; nchange with ((pc ? U)⎽o ⊆ V);
+nelim o;
+##[ #b; #bU0; napply HUV; napply bU0;
+##| #p; #IH; napply subseteq_union_l; ##[ nassumption; ##]
+ #x; *; #i; #H; napply (Im ? i); napply (subseteq_trans … IH); napply H;
+##| #a; #i; #f; #IH; #x; *; #d; napply IH; ##]
+nqed.
+
+nlet rec famF (A: nAx) (F : Ω^A) (x : Ord A) on x : Ω^A ≝
+ match x with
+ [ oO ⇒ F
+ | oS o ⇒ let Fo ≝ famF A F o in Fo ∩ { x | ∀i:𝐈 x.∃j:𝐃 x i.𝐝 x i j ∈ Fo }
+ | oL a i f ⇒ { x | ∀j:𝐃 a i.x ∈ famF A F (f j) }
+ ].
+
+interpretation "famF" 'famU U x = (famF ? U x).
+
+ndefinition ord_fished : ∀A:nAx.∀F:Ω^A.Ω^A ≝ λA,F.{ y | ∀x:Ord A. y ∈ F⎽x }.
+
+interpretation "fished new fish" 'fished U = (ord_fished ? U).
+interpretation "new fish" 'fish a U = (mem ? (ord_fished ? U) a).
+
+ntheorem new_fish_antirefl:
+ ∀A:nAx.∀F:Ω^A.∀a. a ⋉ F → a ∈ F.
+#A; #F; #a; #H; nlapply (H (oO ?)); #aFo; napply aFo;
+nqed.
+
+nlemma co_ord_subset:
+ ∀A:nAx.∀F:Ω^A.∀a,i.∀f:𝐃 a i → Ord A.∀j. F⎽(Λ f) ⊆ F⎽(f j).
+#A; #F; #a; #i; #f; #j; #x; #H; napply H;
+nqed.
+
+naxiom AC_dual :
+ ∀A:nAx.∀a:A.∀i,F. (∀f:𝐃 a i → Ord A.∃x:𝐃 a i.𝐝 a i x ∈ F⎽(f x)) → ∃j:𝐃 a i.∀x:Ord A.𝐝 a i j ∈ F⎽x.
+
+
+ntheorem new_fish_compatible:
+ ∀A:nAx.∀F:Ω^A.∀a. a ⋉ F → ∀i:𝐈 a.∃j:𝐃 a i.𝐝 a i j ⋉ F.
+#A; #F; #a; #aF; #i; nnormalize;
+napply AC_dual; #f;
+nlapply (aF (Λf+1)); #aLf;
+nchange in aLf with (a ∈ F⎽(Λ f) ∧ ∀i:𝐈 a.∃j:𝐃 a i.𝐝 a i j ∈ F⎽(Λ f));
+ncut (∃j:𝐃 a i.𝐝 a i j ∈ F⎽(f j));##[
+ ncases aLf; #_; #H; nlapply (H i); *; #j; #Hj; @j; napply Hj;##] #aLf';
+napply aLf';
+nqed.
+
+ntheorem max_new_fished:
+ ∀A:nAx.∀G,F:Ω^A.G ⊆ F → (∀a.a ∈ G → ∀i.𝐈𝐦[𝐝 a i] ≬ G) → G ⊆ ⋉F.
+#A; #G; #F; #GF; #H; #b; #HbG; #o; ngeneralize in match HbG; ngeneralize in match b;
+nchange with (G ⊆ F⎽o);
+nelim o;
+##[ napply GF;
+##| #p; #IH; napply (subseteq_intersection_r … IH);
+ #x; #Hx; #i; ncases (H … Hx i); #c; *; *; #d; #Ed; #cG;
+ @d; napply IH; napply (setoidification … Ed^-1); napply cG;
+##| #a; #i; #f; #Hf; nchange with (G ⊆ { y | ∀x. y ∈ F⎽(f x) });
+ #b; #Hb; #d; napply (Hf d); napply Hb;
+##]
+nqed.
+
+(*DOCBEGIN
+
+[1]: http://upsilon.cc/~zack/research/publications/notation.pdf
+
+*)
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