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// Dafny prelude
// Created 9 February 2008 by Rustan Leino.
// Converted to Boogie 2 on 28 June 2008.
// Edited sequence axioms 20 October 2009 by Alex Summers.
// Copyright (c) 2008-2010, Microsoft.

const $$Language$Dafny: bool;  // To be recognizable to the ModelViewer as
axiom $$Language$Dafny;        // coming from a Dafny program.

// ---------------------------------------------------------------
// -- References -------------------------------------------------
// ---------------------------------------------------------------

type ref;
const null: ref;

// ---------------------------------------------------------------
// -- Axiomatization of sets -------------------------------------
// ---------------------------------------------------------------

type Set T = [T]bool;

function Set#Empty<T>(): Set T;
axiom (forall<T> o: T :: { Set#Empty()[o] } !Set#Empty()[o]);

function Set#Singleton<T>(T): Set T;
axiom (forall<T> r: T :: { Set#Singleton(r) } Set#Singleton(r)[r]);
axiom (forall<T> r: T, o: T :: { Set#Singleton(r)[o] } Set#Singleton(r)[o] <==> r == o);

function Set#UnionOne<T>(Set T, T): Set T;
axiom (forall<T> a: Set T, x: T, o: T :: { Set#UnionOne(a,x)[o] }
  Set#UnionOne(a,x)[o] <==> o == x || a[o]);
axiom (forall<T> a: Set T, x: T :: { Set#UnionOne(a, x) }
  Set#UnionOne(a, x)[x]);
axiom (forall<T> a: Set T, x: T, y: T :: { Set#UnionOne(a, x), a[y] }
  a[y] ==> Set#UnionOne(a, x)[y]);

function Set#Union<T>(Set T, Set T): Set T;
axiom (forall<T> a: Set T, b: Set T, o: T :: { Set#Union(a,b)[o] }
  Set#Union(a,b)[o] <==> a[o] || b[o]);
axiom (forall<T> a, b: Set T, y: T :: { Set#Union(a, b), a[y] }
  a[y] ==> Set#Union(a, b)[y]);
axiom (forall<T> a, b: Set T, y: T :: { Set#Union(a, b), b[y] }
  b[y] ==> Set#Union(a, b)[y]);
axiom (forall<T> a, b: Set T :: { Set#Union(a, b) }
  Set#Disjoint(a, b) ==>
    Set#Difference(Set#Union(a, b), a) == b &&
    Set#Difference(Set#Union(a, b), b) == a);

function Set#Intersection<T>(Set T, Set T): Set T;
axiom (forall<T> a: Set T, b: Set T, o: T :: { Set#Intersection(a,b)[o] }
  Set#Intersection(a,b)[o] <==> a[o] && b[o]);

axiom (forall<T> a, b: Set T :: { Set#Union(Set#Union(a, b), b) }
  Set#Union(Set#Union(a, b), b) == Set#Union(a, b));
axiom (forall<T> a, b: Set T :: { Set#Union(a, Set#Union(a, b)) }
  Set#Union(a, Set#Union(a, b)) == Set#Union(a, b));
axiom (forall<T> a, b: Set T :: { Set#Intersection(Set#Intersection(a, b), b) }
  Set#Intersection(Set#Intersection(a, b), b) == Set#Intersection(a, b));
axiom (forall<T> a, b: Set T :: { Set#Intersection(a, Set#Intersection(a, b)) }
  Set#Intersection(a, Set#Intersection(a, b)) == Set#Intersection(a, b));

function Set#Difference<T>(Set T, Set T): Set T;
axiom (forall<T> a: Set T, b: Set T, o: T :: { Set#Difference(a,b)[o] }
  Set#Difference(a,b)[o] <==> a[o] && !b[o]);
axiom (forall<T> a, b: Set T, y: T :: { Set#Difference(a, b), b[y] }
  b[y] ==> !Set#Difference(a, b)[y] );

function Set#Subset<T>(Set T, Set T): bool;
axiom(forall<T> a: Set T, b: Set T :: { Set#Subset(a,b) }
  Set#Subset(a,b) <==> (forall o: T :: {a[o]} {b[o]} a[o] ==> b[o]));

function Set#Equal<T>(Set T, Set T): bool;
axiom(forall<T> a: Set T, b: Set T :: { Set#Equal(a,b) }
  Set#Equal(a,b) <==> (forall o: T :: {a[o]} {b[o]} a[o] <==> b[o]));
axiom(forall<T> a: Set T, b: Set T :: { Set#Equal(a,b) }  // extensionality axiom for sets
  Set#Equal(a,b) ==> a == b);

function Set#Disjoint<T>(Set T, Set T): bool;
axiom (forall<T> a: Set T, b: Set T :: { Set#Disjoint(a,b) }
  Set#Disjoint(a,b) <==> (forall o: T :: {a[o]} {b[o]} !a[o] || !b[o]));

function Set#Choose<T>(Set T, TickType): T;
axiom (forall<T> a: Set T, tick: TickType :: { Set#Choose(a, tick) }
  a != Set#Empty() ==> a[Set#Choose(a, tick)]);


// ---------------------------------------------------------------
// -- Axiomatization of multisets --------------------------------
// ---------------------------------------------------------------

function Math#min(a: int, b: int): int;
axiom (forall a: int, b: int :: { Math#min(a, b) } a <= b <==> Math#min(a, b) == a);
axiom (forall a: int, b: int :: { Math#min(a, b) } b <= a <==> Math#min(a, b) == b);
axiom (forall a: int, b: int :: { Math#min(a, b) } Math#min(a, b) == a || Math#min(a, b) == b);

function Math#clip(a: int): int;
axiom (forall a: int :: { Math#clip(a) } 0 <= a ==> Math#clip(a) == a);
axiom (forall a: int :: { Math#clip(a) } a < 0  ==> Math#clip(a) == 0);

type MultiSet T = [T]int;

function $IsGoodMultiSet<T>(ms: MultiSet T): bool;
// ints are non-negative, used after havocing, and for conversion from sequences to multisets.
axiom (forall<T> ms: MultiSet T :: { $IsGoodMultiSet(ms) } 
     $IsGoodMultiSet(ms) <==> (forall o: T :: { ms[o] } 0 <= ms[o]));

function MultiSet#Empty<T>(): MultiSet T;
axiom (forall<T> o: T :: { MultiSet#Empty()[o] } MultiSet#Empty()[o] == 0);

function MultiSet#Singleton<T>(T): MultiSet T;
axiom (forall<T> r: T, o: T :: { MultiSet#Singleton(r)[o] } (MultiSet#Singleton(r)[o] == 1 <==> r == o) &&
                                                            (MultiSet#Singleton(r)[o] == 0 <==> r != o));
axiom (forall<T> r: T :: { MultiSet#Singleton(r) } MultiSet#Singleton(r) == MultiSet#UnionOne(MultiSet#Empty(), r));

function MultiSet#UnionOne<T>(MultiSet T, T): MultiSet T;
// pure containment axiom (in the original multiset or is the added element)
axiom (forall<T> a: MultiSet T, x: T, o: T :: { MultiSet#UnionOne(a,x)[o] }
  0 < MultiSet#UnionOne(a,x)[o] <==> o == x || 0 < a[o]);
// union-ing increases count by one
axiom (forall<T> a: MultiSet T, x: T :: { MultiSet#UnionOne(a, x) }
  MultiSet#UnionOne(a, x)[x] == a[x] + 1);
// non-decreasing
axiom (forall<T> a: MultiSet T, x: T, y: T :: { MultiSet#UnionOne(a, x), a[y] }
  0 < a[y] ==> 0 < MultiSet#UnionOne(a, x)[y]);
// other elements unchanged
axiom (forall<T> a: MultiSet T, x: T, y: T :: { MultiSet#UnionOne(a, x), a[y] }
  x != y ==> a[y] == MultiSet#UnionOne(a, x)[y]);

function MultiSet#Union<T>(MultiSet T, MultiSet T): MultiSet T;
// union-ing is the sum of the contents
axiom (forall<T> a: MultiSet T, b: MultiSet T, o: T :: { MultiSet#Union(a,b)[o] }
  MultiSet#Union(a,b)[o] == a[o] + b[o]);

// two containment axioms
axiom (forall<T> a, b: MultiSet T, y: T :: { MultiSet#Union(a, b), a[y] }
  0 < a[y] ==> 0 < MultiSet#Union(a, b)[y]);
axiom (forall<T> a, b: MultiSet T, y: T :: { MultiSet#Union(a, b), b[y] }
  0 < b[y] ==> 0 < MultiSet#Union(a, b)[y]);

// symmetry axiom
axiom (forall<T> a, b: MultiSet T :: { MultiSet#Union(a, b) }
  MultiSet#Difference(MultiSet#Union(a, b), a) == b &&
  MultiSet#Difference(MultiSet#Union(a, b), b) == a);

function MultiSet#Intersection<T>(MultiSet T, MultiSet T): MultiSet T;
axiom (forall<T> a: MultiSet T, b: MultiSet T, o: T :: { MultiSet#Intersection(a,b)[o] }
  MultiSet#Intersection(a,b)[o] == Math#min(a[o],  b[o]));

// left and right pseudo-idempotence
axiom (forall<T> a, b: MultiSet T :: { MultiSet#Intersection(MultiSet#Intersection(a, b), b) }
  MultiSet#Intersection(MultiSet#Intersection(a, b), b) == MultiSet#Intersection(a, b));
axiom (forall<T> a, b: MultiSet T :: { MultiSet#Intersection(a, MultiSet#Intersection(a, b)) }
  MultiSet#Intersection(a, MultiSet#Intersection(a, b)) == MultiSet#Intersection(a, b));

// multiset difference, a - b. clip() makes it positive.
function MultiSet#Difference<T>(MultiSet T, MultiSet T): MultiSet T;
axiom (forall<T> a: MultiSet T, b: MultiSet T, o: T :: { MultiSet#Difference(a,b)[o] }
  MultiSet#Difference(a,b)[o] == Math#clip(a[o] - b[o]));
axiom (forall<T> a, b: MultiSet T, y: T :: { MultiSet#Difference(a, b), b[y], a[y] }
  a[y] <= b[y] ==> MultiSet#Difference(a, b)[y] == 0 );

// multiset subset means a must have at most as many of each element as b
function MultiSet#Subset<T>(MultiSet T, MultiSet T): bool;
axiom(forall<T> a: MultiSet T, b: MultiSet T :: { MultiSet#Subset(a,b) }
  MultiSet#Subset(a,b) <==> (forall o: T :: {a[o]} {b[o]} a[o] <= b[o]));

function MultiSet#Equal<T>(MultiSet T, MultiSet T): bool;
axiom(forall<T> a: MultiSet T, b: MultiSet T :: { MultiSet#Equal(a,b) }
  MultiSet#Equal(a,b) <==> (forall o: T :: {a[o]} {b[o]} a[o] == b[o]));
// extensionality axiom for multisets
axiom(forall<T> a: MultiSet T, b: MultiSet T :: { MultiSet#Equal(a,b) }
  MultiSet#Equal(a,b) ==> a == b);

function MultiSet#Disjoint<T>(MultiSet T, MultiSet T): bool;
axiom (forall<T> a: MultiSet T, b: MultiSet T :: { MultiSet#Disjoint(a,b) }
  MultiSet#Disjoint(a,b) <==> (forall o: T :: {a[o]} {b[o]} a[o] == 0 || b[o] == 0));

// conversion to a multiset. each element in the original set has duplicity 1.
function MultiSet#FromSet<T>(Set T): MultiSet T;
axiom (forall<T> s: Set T, a: T :: { MultiSet#FromSet(s)[a] }
  (MultiSet#FromSet(s)[a] == 0 <==> !s[a]) &&
  (MultiSet#FromSet(s)[a] == 1 <==> s[a]));

// conversion to a multiset, from a sequence.
function MultiSet#FromSeq<T>(Seq T): MultiSet T;
// conversion produces a good map.
axiom (forall<T> s: Seq T :: { MultiSet#FromSeq(s) } $IsGoodMultiSet(MultiSet#FromSeq(s)) );
// building axiom
axiom (forall<T> s: Seq T, v: T ::
  { MultiSet#FromSeq(Seq#Build(s, v)) }
    MultiSet#FromSeq(Seq#Build(s, v)) == MultiSet#UnionOne(MultiSet#FromSeq(s), v)
  );
axiom (forall<T> :: MultiSet#FromSeq(Seq#Empty(): Seq T) == MultiSet#Empty(): MultiSet T);

// concatenation axiom
axiom (forall<T> a: Seq T, b: Seq T ::
  { MultiSet#FromSeq(Seq#Append(a, b)) }
    MultiSet#FromSeq(Seq#Append(a, b)) == MultiSet#Union(MultiSet#FromSeq(a), MultiSet#FromSeq(b)) );

// update axiom
axiom (forall<T> s: Seq T, i: int, v: T, x: T ::
  { MultiSet#FromSeq(Seq#Update(s, i, v))[x] }
    0 <= i && i < Seq#Length(s) ==>
    MultiSet#FromSeq(Seq#Update(s, i, v))[x] ==
      MultiSet#Union(MultiSet#Difference(MultiSet#FromSeq(s), MultiSet#Singleton(Seq#Index(s,i))), MultiSet#Singleton(v))[x] );
  // i.e. MS(Update(s, i, v)) == MS(s) - {{s[i]}} + {{v}}
axiom (forall<T> s: Seq T, x: T :: { MultiSet#FromSeq(s)[x] }
  (exists i : int :: { Seq#Index(s,i) } 0 <= i && i < Seq#Length(s) && x == Seq#Index(s,i)) <==> 0 < MultiSet#FromSeq(s)[x] );
  
// ---------------------------------------------------------------
// -- Axiomatization of sequences --------------------------------
// ---------------------------------------------------------------

type Seq T;

function Seq#Length<T>(Seq T): int;
axiom (forall<T> s: Seq T :: { Seq#Length(s) } 0 <= Seq#Length(s));

function Seq#Empty<T>(): Seq T;
axiom (forall<T> :: Seq#Length(Seq#Empty(): Seq T) == 0);
axiom (forall<T> s: Seq T :: { Seq#Length(s) } Seq#Length(s) == 0 ==> s == Seq#Empty());

function Seq#Singleton<T>(T): Seq T;
axiom (forall<T> t: T :: { Seq#Length(Seq#Singleton(t)) } Seq#Length(Seq#Singleton(t)) == 1);

function Seq#Build<T>(s: Seq T, val: T): Seq T;
axiom (forall<T> s: Seq T, v: T :: { Seq#Length(Seq#Build(s,v)) }
  Seq#Length(Seq#Build(s,v)) == 1 + Seq#Length(s));
axiom (forall<T> s: Seq T, i: int, v: T :: { Seq#Index(Seq#Build(s,v), i) }
  (i == Seq#Length(s) ==> Seq#Index(Seq#Build(s,v), i) == v) &&
  (i != Seq#Length(s) ==> Seq#Index(Seq#Build(s,v), i) == Seq#Index(s, i)));

function Seq#Append<T>(Seq T, Seq T): Seq T;
axiom (forall<T> s0: Seq T, s1: Seq T :: { Seq#Length(Seq#Append(s0,s1)) }
  Seq#Length(Seq#Append(s0,s1)) == Seq#Length(s0) + Seq#Length(s1));

function Seq#Index<T>(Seq T, int): T;
axiom (forall<T> t: T :: { Seq#Index(Seq#Singleton(t), 0) } Seq#Index(Seq#Singleton(t), 0) == t);
axiom (forall<T> s0: Seq T, s1: Seq T, n: int :: { Seq#Index(Seq#Append(s0,s1), n) }
  (n < Seq#Length(s0) ==> Seq#Index(Seq#Append(s0,s1), n) == Seq#Index(s0, n)) &&
  (Seq#Length(s0) <= n ==> Seq#Index(Seq#Append(s0,s1), n) == Seq#Index(s1, n - Seq#Length(s0))));

function Seq#Update<T>(Seq T, int, T): Seq T;
axiom (forall<T> s: Seq T, i: int, v: T :: { Seq#Length(Seq#Update(s,i,v)) }
  0 <= i && i < Seq#Length(s) ==> Seq#Length(Seq#Update(s,i,v)) == Seq#Length(s));
axiom (forall<T> s: Seq T, i: int, v: T, n: int :: { Seq#Index(Seq#Update(s,i,v),n) }
  0 <= n && n < Seq#Length(s) ==>
    (i == n ==> Seq#Index(Seq#Update(s,i,v),n) == v) &&
    (i != n ==> Seq#Index(Seq#Update(s,i,v),n) == Seq#Index(s,n)));

function Seq#Contains<T>(Seq T, T): bool;
axiom (forall<T> s: Seq T, x: T :: { Seq#Contains(s,x) }
  Seq#Contains(s,x) <==>
    (exists i: int :: { Seq#Index(s,i) } 0 <= i && i < Seq#Length(s) && Seq#Index(s,i) == x));
axiom (forall x: ref ::
  { Seq#Contains(Seq#Empty(), x) }
  !Seq#Contains(Seq#Empty(), x));
axiom (forall<T> s0: Seq T, s1: Seq T, x: T ::
  { Seq#Contains(Seq#Append(s0, s1), x) }
  Seq#Contains(Seq#Append(s0, s1), x) <==>
    Seq#Contains(s0, x) || Seq#Contains(s1, x));

axiom (forall<T> s: Seq T, v: T, x: T ::
  { Seq#Contains(Seq#Build(s, v), x) }
    Seq#Contains(Seq#Build(s, v), x) <==> (v == x || Seq#Contains(s, x)));

axiom (forall<T> s: Seq T, n: int, x: T ::
  { Seq#Contains(Seq#Take(s, n), x) }
  Seq#Contains(Seq#Take(s, n), x) <==>
    (exists i: int :: { Seq#Index(s, i) }
      0 <= i && i < n && i < Seq#Length(s) && Seq#Index(s, i) == x));
axiom (forall<T> s: Seq T, n: int, x: T ::
  { Seq#Contains(Seq#Drop(s, n), x) }
  Seq#Contains(Seq#Drop(s, n), x) <==>
    (exists i: int :: { Seq#Index(s, i) }
      0 <= n && n <= i && i < Seq#Length(s) && Seq#Index(s, i) == x));

function Seq#Equal<T>(Seq T, Seq T): bool;
axiom (forall<T> s0: Seq T, s1: Seq T :: { Seq#Equal(s0,s1) }
  Seq#Equal(s0,s1) <==>
    Seq#Length(s0) == Seq#Length(s1) &&
    (forall j: int :: { Seq#Index(s0,j) } { Seq#Index(s1,j) }
        0 <= j && j < Seq#Length(s0) ==> Seq#Index(s0,j) == Seq#Index(s1,j)));
axiom (forall<T> a: Seq T, b: Seq T :: { Seq#Equal(a,b) }  // extensionality axiom for sequences
  Seq#Equal(a,b) ==> a == b);

function Seq#SameUntil<T>(Seq T, Seq T, int): bool;
axiom (forall<T> s0: Seq T, s1: Seq T, n: int :: { Seq#SameUntil(s0,s1,n) }
  Seq#SameUntil(s0,s1,n) <==>
    (forall j: int :: { Seq#Index(s0,j) } { Seq#Index(s1,j) }
        0 <= j && j < n ==> Seq#Index(s0,j) == Seq#Index(s1,j)));

function Seq#Take<T>(s: Seq T, howMany: int): Seq T;
axiom (forall<T> s: Seq T, n: int :: { Seq#Length(Seq#Take(s,n)) }
  0 <= n ==>
    (n <= Seq#Length(s) ==> Seq#Length(Seq#Take(s,n)) == n) &&
    (Seq#Length(s) < n ==> Seq#Length(Seq#Take(s,n)) == Seq#Length(s)));
axiom (forall<T> s: Seq T, n: int, j: int :: { Seq#Index(Seq#Take(s,n), j) } {:weight 25}
  0 <= j && j < n && j < Seq#Length(s) ==>
    Seq#Index(Seq#Take(s,n), j) == Seq#Index(s, j));

function Seq#Drop<T>(s: Seq T, howMany: int): Seq T;
axiom (forall<T> s: Seq T, n: int :: { Seq#Length(Seq#Drop(s,n)) }
  0 <= n ==>
    (n <= Seq#Length(s) ==> Seq#Length(Seq#Drop(s,n)) == Seq#Length(s) - n) &&
    (Seq#Length(s) < n ==> Seq#Length(Seq#Drop(s,n)) == 0));
axiom (forall<T> s: Seq T, n: int, j: int :: { Seq#Index(Seq#Drop(s,n), j) } {:weight 25}
  0 <= n && 0 <= j && j < Seq#Length(s)-n ==>
    Seq#Index(Seq#Drop(s,n), j) == Seq#Index(s, j+n));

axiom (forall<T> s, t: Seq T ::
  { Seq#Append(s, t) }
  Seq#Take(Seq#Append(s, t), Seq#Length(s)) == s &&
  Seq#Drop(Seq#Append(s, t), Seq#Length(s)) == t);

function Seq#FromArray(h: HeapType, a: ref): Seq BoxType;
axiom (forall h: HeapType, a: ref ::
  { Seq#Length(Seq#FromArray(h,a)) }
    Seq#Length(Seq#FromArray(h, a)) == _System.array.Length(a));
axiom (forall h: HeapType, a: ref :: { Seq#FromArray(h,a): Seq BoxType }
   (forall i: int :: 0 <= i && i < Seq#Length(Seq#FromArray(h, a)) ==> Seq#Index(Seq#FromArray(h, a), i) == read(h, a, IndexField(i))));
axiom (forall<alpha> h: HeapType, o: ref, f: Field alpha, v: alpha, a: ref ::
  { Seq#FromArray(update(h, o, f, v), a) }
    o != a ==> Seq#FromArray(update(h, o, f, v), a) == Seq#FromArray(h, a) );
axiom (forall h: HeapType, i: int, v: BoxType, a: ref ::
  { Seq#FromArray(update(h, a, IndexField(i), v), a) }
    0 <= i && i < _System.array.Length(a) ==> Seq#FromArray(update(h, a, IndexField(i), v), a) == Seq#Update(Seq#FromArray(h, a), i, v) );
/**** Someday:
axiom (forall h: HeapType, a: ref :: { Seq#FromArray(h, a) }
    $IsGoodHeap(h) &&
    a != null && read(h, a, alloc) && dtype(a) == class._System.array && TypeParams(a, 0) == class._System.bool
    ==>
    (forall i: int :: { Seq#Index(Seq#FromArray(h, a), i) }
      0 <= i && i < Seq#Length(Seq#FromArray(h, a)) ==>  $IsCanonicalBoolBox(Seq#Index(Seq#FromArray(h, a), i))));
****/

// Commutability of Take and Drop with Update.
axiom (forall<T> s: Seq T, i: int, v: T, n: int ::
  { Seq#Take(Seq#Update(s, i, v), n) }
    0 <= i && i < n && n <= Seq#Length(s) ==> Seq#Take(Seq#Update(s, i, v), n) == Seq#Update(Seq#Take(s, n), i, v) );
axiom (forall<T> s: Seq T, i: int, v: T, n: int ::
  { Seq#Take(Seq#Update(s, i, v), n) }
    n <= i && i < Seq#Length(s) ==> Seq#Take(Seq#Update(s, i, v), n) == Seq#Take(s, n));
axiom (forall<T> s: Seq T, i: int, v: T, n: int ::
  { Seq#Drop(Seq#Update(s, i, v), n) }
    0 <= n && n <= i && i < Seq#Length(s) ==> Seq#Drop(Seq#Update(s, i, v), n) == Seq#Update(Seq#Drop(s, n), i-n, v) );
axiom (forall<T> s: Seq T, i: int, v: T, n: int ::
  { Seq#Drop(Seq#Update(s, i, v), n) }
    0 <= i && i < n && n < Seq#Length(s) ==> Seq#Drop(Seq#Update(s, i, v), n) == Seq#Drop(s, n));
// Extension axiom, triggers only on Takes from arrays.
axiom (forall h: HeapType, a: ref, n0, n1: int ::
  { Seq#Take(Seq#FromArray(h, a), n0), Seq#Take(Seq#FromArray(h, a), n1) }
    n0 + 1 == n1 && 0 <= n0 && n1 <= _System.array.Length(a) ==> Seq#Take(Seq#FromArray(h, a), n1) == Seq#Build(Seq#Take(Seq#FromArray(h, a), n0), read(h, a, IndexField(n0): Field BoxType)) );
// drop commutes with build.
axiom (forall<T> s: Seq T, v: T, n: int ::
  { Seq#Drop(Seq#Build(s, v), n) }
    0 <= n && n <= Seq#Length(s) ==> Seq#Drop(Seq#Build(s, v), n) == Seq#Build(Seq#Drop(s, n), v) );

// ---------------------------------------------------------------
// -- Axiomatization of Maps -------------------------------------
// ---------------------------------------------------------------

type Map U V;

function Map#Domain<U, V>(Map U V): [U] bool;
function Map#Elements<U, V>(Map U V): [U]V;

function Map#Empty<U, V>(): Map U V;
axiom (forall<U, V> u: U ::
  { Map#Domain(Map#Empty(): Map U V)[u] }
   !Map#Domain(Map#Empty(): Map U V)[u]);

function Map#Glue<U, V>([U] bool, [U]V): Map U V;
axiom (forall<U, V> a: [U] bool, b:[U]V ::
  { Map#Domain(Map#Glue(a, b)) }
    Map#Domain(Map#Glue(a, b)) == a);
axiom (forall<U, V> a: [U] bool, b:[U]V ::
  { Map#Elements(Map#Glue(a, b)) }
    Map#Elements(Map#Glue(a, b)) == b);


//Build is used in displays, and for map updates
function Map#Build<U, V>(Map U V, U, V): Map U V;
/*axiom (forall<U, V> m: Map U V, u: U, v: V ::
  { Map#Domain(Map#Build(m, u, v))[u] } { Map#Elements(Map#Build(m, u, v))[u] }
  Map#Domain(Map#Build(m, u, v))[u] && Map#Elements(Map#Build(m, u, v))[u] == v);*/

axiom (forall<U, V> m: Map U V, u: U, u': U, v: V ::
  { Map#Domain(Map#Build(m, u, v))[u'] } { Map#Elements(Map#Build(m, u, v))[u'] }
  (u' == u ==> Map#Domain(Map#Build(m, u, v))[u'] &&
               Map#Elements(Map#Build(m, u, v))[u'] == v) &&
  (u' != u ==> Map#Domain(Map#Build(m, u, v))[u'] == Map#Domain(m)[u'] &&
               Map#Elements(Map#Build(m, u, v))[u'] == Map#Elements(m)[u']));

//equality for maps
function Map#Equal<U, V>(Map U V, Map U V): bool;
axiom (forall<U, V> m: Map U V, m': Map U V::
  { Map#Equal(m, m') }
    Map#Equal(m, m') <==> (forall u : U :: Map#Domain(m)[u] == Map#Domain(m')[u]) &&
                          (forall u : U :: Map#Domain(m)[u] ==> Map#Elements(m)[u] == Map#Elements(m')[u]));
// extensionality
axiom  (forall<U, V> m: Map U V, m': Map U V::
  { Map#Equal(m, m') }
    Map#Equal(m, m') ==> m == m');

function Map#Disjoint<U, V>(Map U V, Map U V): bool;
axiom (forall<U, V> m: Map U V, m': Map U V ::
  { Map#Disjoint(m, m') }
    Map#Disjoint(m, m') <==> (forall o: U :: {Map#Domain(m)[o]} {Map#Domain(m')[o]} !Map#Domain(m)[o] || !Map#Domain(m')[o]));

// ---------------------------------------------------------------
// -- Boxing and unboxing ----------------------------------------
// ---------------------------------------------------------------

type BoxType;

function $Box<T>(T): BoxType;
function $Unbox<T>(BoxType): T;

axiom (forall<T> x: T :: { $Box(x) } $Unbox($Box(x)) == x);
axiom (forall b: BoxType :: { $Unbox(b): int } $Box($Unbox(b): int) == b);
axiom (forall b: BoxType :: { $Unbox(b): ref } $Box($Unbox(b): ref) == b);
axiom (forall b: BoxType :: { $Unbox(b): Set BoxType } $Box($Unbox(b): Set BoxType) == b);
axiom (forall b: BoxType :: { $Unbox(b): Seq BoxType } $Box($Unbox(b): Seq BoxType) == b);
axiom (forall b: BoxType :: { $Unbox(b): Map BoxType BoxType } $Box($Unbox(b): Map BoxType BoxType) == b);
axiom (forall b: BoxType :: { $Unbox(b): DatatypeType } $Box($Unbox(b): DatatypeType) == b);
// Note: an axiom like this for bool would not be sound; instead, we do:
function $IsCanonicalBoolBox(BoxType): bool;
axiom $IsCanonicalBoolBox($Box(false)) && $IsCanonicalBoolBox($Box(true));
axiom (forall b: BoxType :: { $Unbox(b): bool } $IsCanonicalBoolBox(b) ==> $Box($Unbox(b): bool) == b);

// ---------------------------------------------------------------
// -- Encoding of type names -------------------------------------
// ---------------------------------------------------------------

type ClassName;
const unique class._System.int: ClassName;
const unique class._System.bool: ClassName;
const unique class._System.set: ClassName;
const unique class._System.seq: ClassName;
const unique class._System.multiset: ClassName;
const unique class._System.array: ClassName;

function /*{:never_pattern true}*/ dtype(ref): ClassName;
function /*{:never_pattern true}*/ TypeParams(ref, int): ClassName;

function TypeTuple(a: ClassName, b: ClassName): ClassName;
function TypeTupleCar(ClassName): ClassName;
function TypeTupleCdr(ClassName): ClassName;
// TypeTuple is injective in both arguments:
axiom (forall a: ClassName, b: ClassName :: { TypeTuple(a,b) }
  TypeTupleCar(TypeTuple(a,b)) == a &&
  TypeTupleCdr(TypeTuple(a,b)) == b);

// ---------------------------------------------------------------
// -- Datatypes --------------------------------------------------
// ---------------------------------------------------------------

type DatatypeType;

function /*{:never_pattern true}*/ DtType(DatatypeType): ClassName;  // the analog of dtype for datatype values
function /*{:never_pattern true}*/ DtTypeParams(DatatypeType, int): ClassName;  // the analog of TypeParams

type DtCtorId;
function DatatypeCtorId(DatatypeType): DtCtorId;

function DtRank(DatatypeType): int;

// ---------------------------------------------------------------
// -- Axiom contexts ---------------------------------------------
// ---------------------------------------------------------------

// used to make sure function axioms are not used while their consistency is being checked
const $ModuleContextHeight: int;
const $FunctionContextHeight: int;
const $InMethodContext: bool;

// ---------------------------------------------------------------
// -- Fields -----------------------------------------------------
// ---------------------------------------------------------------

type Field alpha;

function FDim<T>(Field T): int;

function IndexField(int): Field BoxType;
axiom (forall i: int :: { IndexField(i) } FDim(IndexField(i)) == 1);
function IndexField_Inverse<T>(Field T): int;
axiom (forall i: int :: { IndexField(i) } IndexField_Inverse(IndexField(i)) == i);

function MultiIndexField(Field BoxType, int): Field BoxType;
axiom (forall f: Field BoxType, i: int :: { MultiIndexField(f,i) } FDim(MultiIndexField(f,i)) == FDim(f) + 1);
function MultiIndexField_Inverse0<T>(Field T): Field T;
function MultiIndexField_Inverse1<T>(Field T): int;
axiom (forall f: Field BoxType, i: int :: { MultiIndexField(f,i) }
  MultiIndexField_Inverse0(MultiIndexField(f,i)) == f &&
  MultiIndexField_Inverse1(MultiIndexField(f,i)) == i);


function DeclType<T>(Field T): ClassName;

// ---------------------------------------------------------------
// -- Allocatedness ----------------------------------------------
// ---------------------------------------------------------------

const unique alloc: Field bool;
axiom FDim(alloc) == 0;

function DtAlloc(DatatypeType, HeapType): bool;
axiom (forall h, k: HeapType, d: DatatypeType ::
  { $HeapSucc(h, k), DtAlloc(d, h) }
  { $HeapSucc(h, k), DtAlloc(d, k) }
  $HeapSucc(h, k) ==> DtAlloc(d, h) ==> DtAlloc(d, k));

function GenericAlloc(BoxType, HeapType): bool;
axiom (forall h: HeapType, k: HeapType, d: BoxType ::
  { $HeapSucc(h, k), GenericAlloc(d, h) }
  { $HeapSucc(h, k), GenericAlloc(d, k) }
  $HeapSucc(h, k) ==> GenericAlloc(d, h) ==> GenericAlloc(d, k));
// GenericAlloc ==>
axiom (forall b: BoxType, h: HeapType ::
  { GenericAlloc(b, h), h[$Unbox(b): ref, alloc] }
  GenericAlloc(b, h) ==>
  $Unbox(b): ref == null || h[$Unbox(b): ref, alloc]);
//seqs
axiom (forall b: BoxType, h: HeapType, i: int ::
  { GenericAlloc(b, h), Seq#Index($Unbox(b): Seq BoxType, i) }
  GenericAlloc(b, h) &&
  0 <= i && i < Seq#Length($Unbox(b): Seq BoxType) ==>
  GenericAlloc( Seq#Index($Unbox(b): Seq BoxType, i), h ) );

//maps
//seq-like axiom, talking about the range elements
axiom (forall b: BoxType, h: HeapType, i: BoxType ::
  { GenericAlloc(b, h), Map#Domain($Unbox(b): Map BoxType BoxType)[i] }
  GenericAlloc(b, h) && Map#Domain($Unbox(b): Map BoxType BoxType)[i] ==>
  GenericAlloc( Map#Elements($Unbox(b): Map BoxType BoxType)[i], h ) );
//set-like axiom, talking about the domain elements
axiom (forall b: BoxType, h: HeapType, t: BoxType ::
  { GenericAlloc(b, h), Map#Domain($Unbox(b): Map BoxType BoxType)[t] }
  GenericAlloc(b, h) && Map#Domain($Unbox(b): Map BoxType BoxType)[t] ==>
  GenericAlloc(t, h));

//sets
axiom (forall b: BoxType, h: HeapType, t: BoxType ::
  { GenericAlloc(b, h), ($Unbox(b): Set BoxType)[t] }
  GenericAlloc(b, h) && ($Unbox(b): Set BoxType)[t] ==>
  GenericAlloc(t, h));
axiom (forall b: BoxType, h: HeapType ::
  { GenericAlloc(b, h), DtType($Unbox(b): DatatypeType) }
  GenericAlloc(b, h) ==> DtAlloc($Unbox(b): DatatypeType, h));
// ==> GenericAlloc
axiom (forall b: bool, h: HeapType ::
  $IsGoodHeap(h) ==> GenericAlloc($Box(b), h));
axiom (forall x: int, h: HeapType ::
  $IsGoodHeap(h) ==> GenericAlloc($Box(x), h));
axiom (forall r: ref, h: HeapType ::
  { GenericAlloc($Box(r), h) }
  $IsGoodHeap(h) && (r == null || h[r,alloc]) ==> GenericAlloc($Box(r), h));
// boxes in the heap
axiom (forall r: ref, f: Field BoxType, h: HeapType ::
  { GenericAlloc(read(h, r, f), h) }
  $IsGoodHeap(h) && r != null && read(h, r, alloc) ==>
  GenericAlloc(read(h, r, f), h));

// ---------------------------------------------------------------
// -- Arrays -----------------------------------------------------
// ---------------------------------------------------------------

function _System.array.Length(a: ref): int;
axiom (forall o: ref :: 0 <= _System.array.Length(o));

// ---------------------------------------------------------------
// -- The heap ---------------------------------------------------
// ---------------------------------------------------------------

type HeapType = <alpha>[ref,Field alpha]alpha;
function {:inline true} read<alpha>(H:HeapType, r:ref, f:Field alpha): alpha { H[r, f] }
function {:inline true} update<alpha>(H:HeapType, r:ref, f:Field alpha, v:alpha): HeapType { H[r,f := v] }

function $IsGoodHeap(HeapType): bool;
var $Heap: HeapType where $IsGoodHeap($Heap);

function $HeapSucc(HeapType, HeapType): bool;
axiom (forall<alpha> h: HeapType, r: ref, f: Field alpha, x: alpha :: { update(h, r, f, x) }
  $IsGoodHeap(update(h, r, f, x)) ==>
  $HeapSucc(h, update(h, r, f, x)));
axiom (forall a,b,c: HeapType :: { $HeapSucc(a,b), $HeapSucc(b,c) }
  $HeapSucc(a,b) && $HeapSucc(b,c) ==> $HeapSucc(a,c));
axiom (forall h: HeapType, k: HeapType :: { $HeapSucc(h,k) }
  $HeapSucc(h,k) ==> (forall o: ref :: { read(k, o, alloc) } read(h, o, alloc) ==> read(k, o, alloc)));

// ---------------------------------------------------------------
// -- Non-determinism --------------------------------------------
// ---------------------------------------------------------------

type TickType;
var $Tick: TickType;

// ---------------------------------------------------------------
// -- Arithmetic -------------------------------------------------
// ---------------------------------------------------------------

// the connection between % and /
axiom (forall x:int, y:int :: {x % y} {x / y}  x % y == x - x / y * y);

// remainder is always Euclidean Modulus.
axiom (forall x:int, y:int :: {x % y}  0 < y  ==>  0 <= x % y  &&  x % y < y);
axiom (forall x:int, y:int :: {x % y}  y < 0  ==>  0 <= x % y  &&  x % y < -y);

// the following axiom has some unfortunate matching, but it does state a property about % that
// is sometimes useful
axiom (forall a: int, b: int, d: int :: { a % d, b % d } 2 <= d && a % d == b % d && a < b  ==>  a + d <= b);

// ---------------------------------------------------------------