formalsec / smtml / 463

    else false

    | App (s1, l1), App (s2, l2) -> Symbol.equal s1 s2 && list_eq l1 l2

    | Triop (t1, op1, e1, e3, e5), Triop (t2, op2, e2, e4, e6) ->

      Ty.equal t1 t2 && Ty.Triop.equal op1 op2 && phys_equal e1 e2

      && phys_equal e3 e4 && phys_equal e5 e6

    | Cvtop (t1, op1, e1), Cvtop (t2, op2, e2) ->

      Ty.equal t1 t2 && Ty.Cvtop.equal op1 op2 && phys_equal e1 e2

    | Naryop (t1, op1, l1), Naryop (t2, op2, l2) ->

      Ty.equal t1 t2 && Ty.Naryop.equal op1 op2 && list_eq l1 l2

    | Extract (e1, h1, l1), Extract (e2, h2, l2) ->

      phys_equal e1 e2 && h1 = h2 && l1 = l2

    | Concat (e1, e3), Concat (e2, e4) -> phys_equal e1 e2 && phys_equal e3 e4

    | Binder (binder1, vars1, e1), Binder (binder2, vars2, e2) ->

      Binder.equal binder1 binder2 && list_eq vars1 vars2 && phys_equal e1 e2

    | ( ( Val _ | Ptr _ | Symbol _ | List _ | App _ | Unop _ | Binop _ | Triop _

        | Relop _ | Cvtop _ | Naryop _ | Extract _ | Concat _ | Binder _ )

    | App (s, es) ->

      List.fold_left (fun acc x -> combine acc x.Hc.tag) h_s es

    | Triop (ty, op, e1, e2, e3) ->

      let h = combine h (Ty.Triop.hash op) in

      let h = combine h e1.tag in

      let h = combine h e2.tag in

      combine h e3.tag

    | Naryop (ty, op, es) ->

      let h = combine h (Ty.Naryop.hash op) in

      List.fold_left (fun acc x -> combine acc x.Hc.tag) h es

    | Binder (b, vars, e) ->

      let h_vars = List.fold_left (fun acc x -> combine acc x.Hc.tag) h vars in

      combine h_vars e.tag

  let to_int hte = hash hte

  let compare x y = compare (to_int x) (to_int y)

let[@inline] compare (hte1 : t) (hte2 : t) = compare hte1.tag hte2.tag

  | Val x -> Value.type_of x

  | Ptr _ -> Ty_bitv 32

  | List _ -> Ty_list

  | App (sym, _) -> begin match sym.ty with Ty_none -> Ty_app | ty -> ty end

  | Triop (_, Ite, _, hte1, hte2) ->

    assert (

      Ty.equal ty1 ty2 );

  | Cvtop (_, (Zero_extend m | Sign_extend m), hte) -> (

  | Unop (ty, _, _)

  | Binop (ty, _, _, _)

  | Triop (ty, _, _, _, _)

  | Relop (ty, _, _, _)

  | Cvtop (ty, _, _)

  | Naryop (ty, _, _) ->

  | Concat (e1, e2) -> (

    match (ty e1, ty e2) with

    | Ty_bitv n1, Ty_bitv n2 -> Ty_bitv (n1 + n2)

    | t1, t2 ->

  | Binder (_, _, e) -> ty e

  match view v with

  | Val _ -> false

  | Symbol _ -> true

  | Ptr { offset; _ } -> is_symbolic offset

  | Unop (_, _, v) | Cvtop (_, _, v) | Extract (v, _, _) | Binder (_, _, v) ->

  | Binop (_, _, v1, v2) | Relop (_, _, v1, v2) | Concat (v1, v2) ->

    is_symbolic v1 || is_symbolic v2

  | Triop (_, _, v1, v2, v3) ->

    is_symbolic v1 || is_symbolic v2 || is_symbolic v3

  | List vs | App (_, vs) | Naryop (_, _, vs) -> List.exists is_symbolic vs

    | Ptr { offset; _ } -> symbols offset

    | List es -> List.iter symbols es

    | App (_, es) -> List.iter symbols es

    | Unop (_, _, e1) -> symbols e1

    | Triop (_, _, e1, e2, e3) ->

      symbols e2;

      symbols e3

    | Cvtop (_, _, e) -> symbols e

    | Naryop (_, _, es) -> List.iter symbols es

    | Extract (e, _, _) -> symbols e

    | Concat (e1, e2) ->

      symbols e2

    | Binder (_, vars, e) ->

      symbols e

  match view hte with

  | Val v -> Value.pp fmt v

  | Ptr { base; offset } -> Fmt.pf fmt "(Ptr %a %a)" Bitvector.pp base pp offset

  | Symbol s -> Fmt.pf fmt "@[<hov 1>%a@]" Symbol.pp s

  | List v -> Fmt.pf fmt "@[<hov 1>[%a]@]" (Fmt.list ~sep:Fmt.comma pp) v

  | App (s, v) ->

    Fmt.pf fmt "@[<hov 1>(%a@ %a)@]" Symbol.pp s (Fmt.list ~sep:Fmt.comma pp) v

  | Unop (ty, op, e) ->

  | Binop (ty, op, e1, e2) ->

  | Triop (ty, op, e1, e2, e3) ->

  | Relop (ty, op, e1, e2) ->

  | Cvtop (ty, op, e) ->

  | Naryop (ty, op, es) ->

      (Fmt.list ~sep:Fmt.comma pp)

  | Extract (e, h, l) -> Fmt.pf fmt "@[<hov 1>(extract@ %a@ %d@ %d)@]" pp e l h

  | Concat (e1, e2) -> Fmt.pf fmt "@[<hov 1>(++@ %a@ %a)@]" pp e1 pp e2

  | Binder (b, vars, e) ->

    Fmt.pf fmt "@[<hov 1>(%a@ (%a)@ %a)@]" Binder.pp b (Fmt.list ~sep:Fmt.sp pp)

let pp_list fmt (es : t list) = Fmt.hovbox (Fmt.list ~sep:Fmt.comma pp) fmt es

  let def_num_printer = Num.get_default_printer () in

  Num.set_default_printer `Hexadecimal;

  Bitvector.set_default_printer `WithType;

  let pp_symbols fmt syms =

    Fmt.list ~sep:Fmt.cut

        let t = Symbol.type_of sym in

        Fmt.pf fmt "(let-const %a %a)" Symbol.pp sym Ty.pp t )

    Fmt.list ~sep:Fmt.cut

      (fun fmt e -> Fmt.pf fmt "(assert @[<h 2>%a@])" pp e)

  if List.length syms > 0 then Fmt.pf fmt "@[<v>%a@]@\n" pp_symbols syms;

  if List.length es > 0 then Fmt.pf fmt "@[<v>%a@]@\n" pp_asserts es;

  Fmt.string fmt "(check-sat)";

  Num.set_default_printer def_num_printer;

  Bitvector.set_default_printer `Pretty

let to_string e = Fmt.str "%a" pp e

let app symbol args = make (App (symbol, args))

let[@inline] binder bt vars expr = make (Binder (bt, vars, expr))

let let_in vars body = binder Let_in vars body

let forall vars body = binder Forall vars body

let exists vars body = binder Exists vars body

  let make_relop lhs rhs = Relop (ty', op, lhs, rhs) in

  let ty1, ty2 = (ty e1, ty e2) in

  if not (Ty.equal ty1 ty2) then make_relop e1 e2

  else begin

    | Ty_bitv m ->

      let zero = make (Val (Bitv (Bitvector.make Z.zero m))) in

      make_relop binop zero

    | Ty_int ->

      let zero = make (Val (Int Int.zero)) in

      make_relop binop zero

    | Ty_real ->

      let zero = make (Val (Real 0.)) in

      make_relop binop zero

    | _ -> make_relop e1 e2

  let e =

    | Relop (ty, Eq, e1, e2) -> normalize_eq_or_ne Ne (ty, e1, e2)

    | Relop (ty, Ne, e1, e2) -> normalize_eq_or_ne Eq (ty, e1, e2)

    | Relop (ty, Lt, e1, e2) -> Relop (ty, Le, e2, e1)

    | Relop (ty, LtU, e1, e2) -> Relop (ty, LeU, e2, e1)

    | Relop (ty, Le, e1, e2) -> Relop (ty, Lt, e2, e1)

    | Relop (ty, LeU, e1, e2) -> Relop (ty, LtU, e2, e1)

    | Relop (ty, Gt, e1, e2) -> Relop (ty, Le, e1, e2)

    | Relop (ty, GtU, e1, e2) -> Relop (ty, LeU, e1, e2)

    | Relop (ty, Ge, e1, e2) -> Relop (ty, Lt, e1, e2)

    | Relop (ty, GeU, e1, e2) -> Relop (ty, LtU, e1, e2)

    | _ -> Fmt.failwith "negate_relop: not a relop."

  | Ty.Unop.(Regexp_loop _ | Regexp_star), _ -> raw_unop ty op hte

  | Not, Relop (_, _, _, _) -> negate_relop hte

  | Trim, Cvtop (Ty_real, ToString, _) -> hte

  | Ty.Binop.(String_in_re | Regexp_range), _, _ -> raw_binop ty op hte1 hte2

    else raw_binop ty op hte1 hte2

  | Sub, _, Ptr { base; offset } ->

    let base = value (Bitv base) in

    binop ty Sub hte1 (binop (Ty_bitv m) Add base offset)

  | (Add | Or), Val (Bitv bv), _ when Bitvector.eqz bv -> hte2

  | (And | Div | DivU | Mul | Rem | RemU), Val (Bitv bv), _

  | (Add | Or), _, Val (Bitv bv) when Bitvector.eqz bv -> hte1

  | Mul, Val (Bitv bv), _ when Bitvector.eq_one bv -> hte2

  | Mul, _, Val (Bitv bv) when Bitvector.eq_one bv -> hte1

  | List_append, List _, (List [] | Val (List [])) -> hte1

  | List_append, (List [] | Val (List [])), List _ -> hte2

  | List_append, Val (List l0), List l1 -> make (List (List.map value l0 @ l1))

  | List_append, List l0, List l1 -> make (List (l0 @ l1))

let raw_triop ty op e1 e2 e3 = make (Triop (ty, op, e1, e2, e3)) [@@inline]

  | Ite, _, Triop (_, Ite, c2, r1, r2), Triop (_, Ite, _, _, _) ->

    let cond = binop Ty_bool And e1 c2 in

    raw_triop ty Ite cond r1 else_

  | _ -> raw_triop ty op e1 e2 e3

    | Ty.Ty_bool | Ty_bitv _ | Ty_int | Ty_unit -> both_phys_eq

    | Ty_fp _ | Ty_app | Ty_list | Ty_real | Ty_regexp | Ty_roundingMode

    | Ty_none | Ty_str ->

  | Ne, Val (Real v), _ | Ne, _, Val (Real v) ->

    if Float.is_nan v || Float.is_infinite v then value True

    else if both_phys_eq then value False

    else raw_relop ty op hte1 hte2

  | _, Val (Real v), _ | _, _, Val (Real v) ->

    if Float.is_nan v || Float.is_infinite v then value False

      raw_relop ty op hte1 hte2

  | Eq, _, Val Nothing | Eq, Val Nothing, _ -> value False

  | Ne, _, Val Nothing | Ne, Val Nothing, _ -> value True

  | Eq, _, Val (App (`Op "symbol", [ Str _ ]))

  | Eq, Val (App (`Op "symbol", [ Str _ ])), _ ->

  | Ne, _, Val (App (`Op "symbol", [ Str _ ]))

  | Ne, Val (App (`Op "symbol", [ Str _ ])), _ ->

  | ( Eq

    when both_phys_eq || (prec1 = prec2 && Symbol.equal s1 s2) ->

    raw_unop Ty_bool Not (raw_unop (Ty_fp prec1) Is_nan hte1)

    if both_phys_eq then value True

    else if Bitvector.equal b1 b2 then relop Ty_bool Eq os1 os2

    if both_phys_eq then value False

    else if Bitvector.equal b1 b2 then relop Ty_bool Ne os1 os2

    if both_phys_eq then value True

    else if Bitvector.equal b1 b2 then relop ty op os1 os2

  | op, List l1, List l2 -> relop_list op l1 l2

  | GeU, _, _ -> relop ty LeU hte2 hte1

  match (op, l1, l2) with

  | Eq, [], [] -> value True

  | Eq, _, [] | Eq, [], _ -> value False

  | Eq, l1, l2 ->

    if not (List.compare_lengths l1 l2 = 0) then value False

      List.fold_left2

          binop Ty_bool And acc

          match (ty a, ty b) with

          | Ty_real, Ty_real -> relop Ty_real Eq a b

          | _ -> relop Ty_bool Eq a b )

        (value True) l1 l2

  | Ne, _, _ -> unop Ty_bool Not @@ relop_list Eq l1 l2

  | Ty.Cvtop.String_to_re, _ -> raw_cvtop theory op hte

  | String_to_float, Cvtop (Ty_real, ToString, hte) -> hte

  | ( Reinterpret_float

  | WrapI64, Cvtop (Ty_bitv 64, Zero_extend 32, hte) ->

    assert (Ty.equal theory (ty hte) && Ty.equal theory (Ty_bitv 32));

let raw_naryop ty op es = make (Naryop (ty, op, es)) [@@inline]

  if List.for_all (fun e -> match view e with Val _ -> true | _ -> false) es

    match (ty, op, List.map view es) with

    | ( Ty_str

    | Ty_str, Concat, [ Naryop (Ty_str, Concat, htes); hte ] ->

      raw_naryop Ty_str Concat (htes @ [ make hte ])

    | Ty_str, Concat, [ hte; Naryop (Ty_str, Concat, htes) ] ->

      raw_naryop Ty_str Concat (make hte :: htes)

    | _ -> raw_naryop ty op es

  | Concat (e, _), 8, 4 when Ty.size (ty e) = 4 -> e

    if high - low = Ty.size (ty hte) then hte else raw_extract hte ~high ~low

  | Val (Bitv _), Concat (({ node = Val (Bitv _); _ } as b), se) ->

    raw_concat (concat msb b) se

  | Extract (_, _, _), Concat (({ node = Extract (_, _, _); _ } as e2), e3) ->

    raw_concat (concat msb e2) e3

  | Ptr { base; offset } ->

    if not in_relop then make (Ptr { base; offset })

    else binop (Ty_bitv 32) Add (value (Bitv base)) offset

  | List es -> make @@ List (List.map (simplify_expr ~in_relop) es)

  | App (x, es) -> make @@ App (x, List.map (simplify_expr ~in_relop) es)

  | Unop (ty, op, e) ->

    unop ty op e

  | Relop (ty, op, e1, e2) ->

    let e2 = simplify_expr ~in_relop:true e2 in

    relop ty op e1 e2

  | Triop (ty, op, c, e1, e2) ->

    let e1 = simplify_expr ~in_relop e1 in

    let e2 = simplify_expr ~in_relop e2 in

    triop ty op c e1 e2

  | Cvtop (ty, op, e) ->

    cvtop ty op e

  | Naryop (ty, op, es) ->

    naryop ty op es

  | Extract (s, high, low) ->

    extract s ~high ~low

  | Concat (e1, e2) ->

    let lsb = simplify_expr ~in_relop e2 in

    concat msb lsb

  | Binder _ ->

    | Some simplified -> simplified

    | Val True -> Some true

    | Val False -> Some false

    | _ -> None

  let to_val b = if b then true_ else false_

  let v b = to_val b [@@inline]

    let bexpr = view b in

    match of_val bexpr with

    | Some b -> to_val (not b)

    | None -> (

      | Unop (Ty_bool, Not, cond) -> cond

      | _ -> unop Ty_bool Not b )

    match (view b1, view b2) with

    | Val True, Val True | Val False, Val False -> true_

    | _ -> relop Ty_bool Eq b1 b2

    match (view b1, view b2) with

    | Val True, Val False | Val False, Val True -> true_

    | _ -> relop Ty_bool Ne b1 b2

    match (of_val (view b1), of_val (view b2)) with

    | Some true, _ -> b2

    | _, Some true -> b1

    | Some false, _ | _, Some false -> false_

    | _ -> binop Ty_bool And b1 b2

    match (of_val (view b1), of_val (view b2)) with

    | Some false, _ -> b2

    | _, Some false -> b1

    | Some true, _ | _, Some true -> true_

    | _ -> binop Ty_bool Or b1 b2

  let ite c r1 r2 = triop Ty_bool Ite c r1 r2

  let v i = value (T.value i)

  let sym x = symbol Symbol.(x @: T.ty)

  let ( ~- ) e = unop T.ty Neg e

  let ( = ) e1 e2 = relop Ty_bool Eq e1 e2

  let ( != ) e1 e2 = relop Ty_bool Ne e1 e2

  let ( > ) e1 e2 = relop T.ty Gt e1 e2

  let ( >= ) e1 e2 = relop T.ty Ge e1 e2

  let ( < ) e1 e2 = relop T.ty Lt e1 e2

  let ( <= ) e1 e2 = relop T.ty Le e1 e2

    let value i = Value.Bitv (Bitvector.of_int8 i)

    let value i = Value.Bitv (Bitvector.of_int32 i)

    let value i = Value.Bitv (Bitvector.of_int64 i)

      let value f = Value.Num (F32 (Int32.bits_of_float f))

    let ( = ) e1 e2 = relop (Ty_fp 32) Eq e1 e2

    let ( != ) e1 e2 = relop (Ty_fp 32) Ne e1 e2

      let value f = Value.Num (F64 (Int64.bits_of_float f))

    let ( = ) e1 e2 = relop (Ty_fp 64) Eq e1 e2

    let ( != ) e1 e2 = relop (Ty_fp 64) Ne e1 e2

    | Unop (ty, op, e) ->

    | Val _ -> e

    | Ptr e ->

      make @@ Ptr { e with offset }

    | List vs ->

      list vs

    | App (x, vs) ->

      app x vs

    | Unop (ty, op, v) ->

      unop ty op v

    | Binop (ty, op, v1, v2) ->

      let v2 = aux v2 in

      binop ty op v1 v2

    | Triop (ty, op, v1, v2, v3) ->

      let v2 = aux v2 in

      let v3 = aux v3 in

      triop ty op v1 v2 v3

    | Cvtop (ty, op, v) ->

      cvtop ty op v

    | Relop (ty, op, v1, v2) ->

      let v2 = aux v2 in

      relop ty op v1 v2

    | Naryop (ty, op, vs) ->

      naryop ty op vs

    | Extract (e, high, low) ->

      extract e ~high ~low

    | Concat (e1, e2) ->

      let e2 = aux e2 in

      concat e1 e2

    | Binder (b, vars, e) ->

      binder b vars e

  let to_list s = elements s

    Fmt.pf fmt "@[<hov 1>%a@]"

      (Fmt.iter iter ~sep:(fun fmt () -> Fmt.pf fmt "@;") pp)

    let tbl = Hashtbl.create 64 in

    let rec symbols hte =

      match view hte with

      | Val _ -> ()

      | Ptr { offset; _ } -> symbols offset

      | Symbol s -> Hashtbl.replace tbl s ()

      | List es -> List.iter symbols es

      | App (_, es) -> List.iter symbols es

      | Unop (_, _, e1) -> symbols e1

      | Binop (_, _, e1, e2) ->

        symbols e2

      | Triop (_, _, e1, e2, e3) ->

        symbols e2;

        symbols e3

      | Relop (_, _, e1, e2) ->

        symbols e2

      | Cvtop (_, _, e) -> symbols e

      | Naryop (_, _, es) -> List.iter symbols es

      | Extract (e, _, _) -> symbols e

      | Concat (e1, e2) ->

        symbols e2

      | Binder (_, vars, e) ->

        symbols e

    Hashtbl.fold (fun k () acc -> k :: acc) tbl []

    fold

        let elt = f elt in

        add elt set )

    map (inline_symbol_values symbol_map) set

  match view e with

  | Binop (Ty_bool, And, e1, e2) ->

    let s2 = split_conjunctions e2 in

    Set.union s1 s2

  | _ -> Set.singleton e

  match view e with

  | Binop (Ty_bool, Or, e1, e2) ->

    let s2 = split_disjunctions e2 in

    Set.union s1 s2

  | _ -> Set.singleton e