src/ZF/zf.thy
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(*  Title:      ZF/zf.thy
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    ID:         $Id$
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    Author:     Lawrence C Paulson and Martin D Coen, CU Computer Laboratory
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    Copyright   1993  University of Cambridge
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Zermelo-Fraenkel Set Theory
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*)
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ZF = FOL +
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types
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  i, is 0
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arities
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  i :: term
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consts
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  "0"           :: "i"                          ("0") (*the empty set*)
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  Pow           :: "i => i"                         (*power sets*)
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  Inf           :: "i"                              (*infinite set*)
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  (* Bounded Quantifiers *)
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  "@Ball"       :: "[idt, i, o] => o"           ("(3ALL _:_./ _)" 10)
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  "@Bex"        :: "[idt, i, o] => o"           ("(3EX _:_./ _)" 10)
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  Ball          :: "[i, i => o] => o"
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  Bex           :: "[i, i => o] => o"
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  (* General Union and Intersection *)
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  "@INTER"      :: "[idt, i, i] => i"           ("(3INT _:_./ _)" 10)
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  "@UNION"      :: "[idt, i, i] => i"           ("(3UN _:_./ _)" 10)
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  Union, Inter  :: "i => i"
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  (* Variations on Replacement *)
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  "@Replace"    :: "[idt, idt, i, o] => i"      ("(1{_ ./ _: _, _})")
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  "@RepFun"     :: "[i, idt, i] => i"           ("(1{_ ./ _: _})")
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  "@Collect"    :: "[idt, i, o] => i"           ("(1{_: _ ./ _})")
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  PrimReplace   :: "[i, [i, i] => o] => i"
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  Replace       :: "[i, [i, i] => o] => i"
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  RepFun        :: "[i, i => i] => i"
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  Collect       :: "[i, i => o] => i"
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  (* Descriptions *)
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  The           :: "(i => o) => i"              (binder "THE " 10)
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  if            :: "[o, i, i] => i"
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  (* Enumerations of type i *)
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  ""            :: "i => is"                    ("_")
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  "@Enum"       :: "[i, is] => is"              ("_,/ _")
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  (* Finite Sets *)
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  "@Finset"     :: "is => i"                    ("{(_)}")
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  Upair, cons   :: "[i, i] => i"
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  succ          :: "i => i"
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  (* Ordered Pairing and n-Tuples *)
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  "@Tuple"      :: "[i, is] => i"               ("<(_,/ _)>")
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  Pair          :: "[i, i] => i"
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  fst, snd      :: "i => i"
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  split         :: "[[i, i] => i, i] => i"
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  fsplit        :: "[[i, i] => o, i] => o"
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  (* Sigma and Pi Operators *)
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  "@PROD"       :: "[idt, i, i] => i"           ("(3PROD _:_./ _)" 10)
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  "@SUM"        :: "[idt, i, i] => i"           ("(3SUM _:_./ _)" 10)
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  "@lam"        :: "[idt, i, i] => i"           ("(3lam _:_./ _)" 10)
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  Pi, Sigma     :: "[i, i => i] => i"
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  (* Relations and Functions *)
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  domain        :: "i => i"
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  range         :: "i => i"
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  field         :: "i => i"
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  converse      :: "i => i"
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  Lambda        :: "[i, i => i] => i"
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  restrict      :: "[i, i] => i"
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  (* Infixes in order of decreasing precedence *)
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  "``"  :: "[i, i] => i"    (infixl 90) (*image*)
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  "-``" :: "[i, i] => i"    (infixl 90) (*inverse image*)
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  "`"   :: "[i, i] => i"    (infixl 90) (*function application*)
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  (*Except for their translations, * and -> are right and ~: left associative infixes*)
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  " *"  :: "[i, i] => i"    ("(_ */ _)" [81, 80] 80) (*Cartesian product*)
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  "Int" :: "[i, i] => i"    (infixl 70) (*binary intersection*)
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  "Un"  :: "[i, i] => i"    (infixl 65) (*binary union*)
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  "-"   :: "[i, i] => i"    (infixl 65) (*set difference*)
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  " ->" :: "[i, i] => i"    ("(_ ->/ _)" [61, 60] 60) (*function space*)
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  "<="  :: "[i, i] => o"    (infixl 50) (*subset relation*)
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  ":"   :: "[i, i] => o"    (infixl 50) (*membership relation*)
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  "~:"  :: "[i, i] => o"    ("(_ ~:/ _)" [50, 51] 50) (*negated membership relation*)
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translations
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  "{x, xs}"     == "cons(x, {xs})"
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  "{x}"         == "cons(x, 0)"
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  "<x, y, z>"   == "<x, <y, z>>"
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  "<x, y>"      == "Pair(x, y)"
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  "{x:A. P}"    == "Collect(A, %x. P)"
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  "{y. x:A, Q}" == "Replace(A, %x y. Q)"
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  "{f. x:A}"    == "RepFun(A, %x. f)"
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  "INT x:A. B"  == "Inter({B. x:A})"
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  "UN x:A. B"   == "Union({B. x:A})"
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  "PROD x:A. B" => "Pi(A, %x. B)"
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  "SUM x:A. B"  => "Sigma(A, %x. B)"
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  "A -> B"      => "Pi(A, _K(B))"
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  "A * B"       => "Sigma(A, _K(B))"
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  "lam x:A. f"  == "Lambda(A, %x. f)"
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  "ALL x:A. P"  == "Ball(A, %x. P)"
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  "EX x:A. P"   == "Bex(A, %x. P)"
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  "x ~: y"      == "~ (x : y)"
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rules
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 (* Bounded Quantifiers *)
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Ball_def        "Ball(A,P) == ALL x. x:A --> P(x)"
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Bex_def         "Bex(A,P) == EX x. x:A & P(x)"
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subset_def      "A <= B == ALL x:A. x:B"
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 (* ZF axioms -- see Suppes p.238
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    Axioms for Union, Pow and Replace state existence only,
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        uniqueness is derivable using extensionality.  *)
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extension       "A = B <-> A <= B & B <= A"
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union_iff       "A : Union(C) <-> (EX B:C. A:B)"
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power_set       "A : Pow(B) <-> A <= B"
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succ_def        "succ(i) == cons(i,i)"
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 (*We may name this set, though it is not uniquely defined. *)
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infinity        "0:Inf & (ALL y:Inf. succ(y): Inf)"
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 (*This formulation facilitates case analysis on A. *)
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foundation      "A=0 | (EX x:A. ALL y:x. y~:A)"
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 (* Schema axiom since predicate P is a higher-order variable *)
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replacement     "(ALL x:A. ALL y z. P(x,y) & P(x,z) --> y=z) ==> \
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\                        b : PrimReplace(A,P) <-> (EX x:A. P(x,b))"
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 (* Derived form of replacement, restricting P to its functional part.
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    The resulting set (for functional P) is the same as with
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    PrimReplace, but the rules are simpler. *)
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Replace_def     "Replace(A,P) == PrimReplace(A, %x y. (EX!z.P(x,z)) & P(x,y))"
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 (* Functional form of replacement -- analgous to ML's map functional *)
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RepFun_def      "RepFun(A,f) == {y . x:A, y=f(x)}"
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 (* Separation and Pairing can be derived from the Replacement
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    and Powerset Axioms using the following definitions.  *)
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Collect_def     "Collect(A,P) == {y . x:A, x=y & P(x)}"
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 (*Unordered pairs (Upair) express binary union/intersection and cons;
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   set enumerations translate as {a,...,z} = cons(a,...,cons(z,0)...)  *)
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Upair_def   "Upair(a,b) == {y. x:Pow(Pow(0)), (x=0 & y=a) | (x=Pow(0) & y=b)}"
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cons_def    "cons(a,A) == Upair(a,a) Un A"
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 (* Difference, general intersection, binary union and small intersection *)
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Diff_def        "A - B    == { x:A . ~(x:B) }"
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Inter_def       "Inter(A) == { x:Union(A) . ALL y:A. x:y}"
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Un_def          "A Un  B  == Union(Upair(A,B))"
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Int_def         "A Int B  == Inter(Upair(A,B))"
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 (* Definite descriptions -- via Replace over the set "1" *)
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the_def         "The(P)    == Union({y . x:{0}, P(y)})"
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if_def          "if(P,a,b) == THE z. P & z=a | ~P & z=b"
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 (* Ordered pairs and disjoint union of a family of sets *)
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 (* this "symmetric" definition works better than {{a}, {a,b}} *)
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Pair_def        "<a,b>  == {{a,a}, {a,b}}"
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fst_def         "fst == split(%x y.x)"
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snd_def         "snd == split(%x y.y)"
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split_def       "split(c,p) == THE y. EX a b. p=<a,b> & y=c(a,b)"
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fsplit_def      "fsplit(R,z) == EX x y. z=<x,y> & R(x,y)"
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Sigma_def       "Sigma(A,B) == UN x:A. UN y:B(x). {<x,y>}"
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 (* Operations on relations *)
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(*converse of relation r, inverse of function*)
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converse_def    "converse(r) == {z. w:r, EX x y. w=<x,y> & z=<y,x>}"
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domain_def      "domain(r) == {x. w:r, EX y. w=<x,y>}"
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range_def       "range(r) == domain(converse(r))"
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field_def       "field(r) == domain(r) Un range(r)"
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image_def       "r `` A  == {y : range(r) . EX x:A. <x,y> : r}"
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vimage_def      "r -`` A == converse(r)``A"
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 (* Abstraction, application and Cartesian product of a family of sets *)
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lam_def         "Lambda(A,b) == {<x,b(x)> . x:A}"
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apply_def       "f`a == THE y. <a,y> : f"
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Pi_def          "Pi(A,B)  == {f: Pow(Sigma(A,B)). ALL x:A. EX! y. <x,y>: f}"
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  (* Restrict the function f to the domain A *)
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restrict_def    "restrict(f,A) == lam x:A.f`x"
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end
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ML
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(* 'Dependent' type operators *)
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val print_translation =
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  [("Pi", dependent_tr' ("@PROD", " ->")),
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   ("Sigma", dependent_tr' ("@SUM", " *"))];
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c78503b345c4 "The" now a binder, removed translation;
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