(* Title: HOL/Library/Old_SMT/old_smt_real.ML
Author: Sascha Boehme, TU Muenchen
SMT setup for reals.
*)
signature OLD_SMT_REAL =
sig
val setup: theory -> theory
end
structure Old_SMT_Real: OLD_SMT_REAL =
struct
(* SMT-LIB logic *)
fun smtlib_logic ts =
if exists (Term.exists_type (Term.exists_subtype (equal @{typ real}))) ts
then SOME "AUFLIRA"
else NONE
(* SMT-LIB and Z3 built-ins *)
local
fun real_num _ i = SOME (string_of_int i ^ ".0")
fun is_linear [t] = Old_SMT_Utils.is_number t
| is_linear [t, u] = Old_SMT_Utils.is_number t orelse Old_SMT_Utils.is_number u
| is_linear _ = false
fun mk_times ts = Term.list_comb (@{const times (real)}, ts)
fun times _ _ ts = if is_linear ts then SOME ("*", 2, ts, mk_times) else NONE
in
val setup_builtins =
Old_SMT_Builtin.add_builtin_typ Old_SMTLIB_Interface.smtlibC
(@{typ real}, K (SOME "Real"), real_num) #>
fold (Old_SMT_Builtin.add_builtin_fun' Old_SMTLIB_Interface.smtlibC) [
(@{const less (real)}, "<"),
(@{const less_eq (real)}, "<="),
(@{const uminus (real)}, "~"),
(@{const plus (real)}, "+"),
(@{const minus (real)}, "-") ] #>
Old_SMT_Builtin.add_builtin_fun Old_SMTLIB_Interface.smtlibC
(Term.dest_Const @{const times (real)}, times) #>
Old_SMT_Builtin.add_builtin_fun' Old_Z3_Interface.smtlib_z3C
(@{const times (real)}, "*") #>
Old_SMT_Builtin.add_builtin_fun' Old_Z3_Interface.smtlib_z3C
(@{const divide (real)}, "/")
end
(* Z3 constructors *)
local
fun z3_mk_builtin_typ (Old_Z3_Interface.Sym ("Real", _)) = SOME @{typ real}
| z3_mk_builtin_typ (Old_Z3_Interface.Sym ("real", _)) = SOME @{typ real}
(*FIXME: delete*)
| z3_mk_builtin_typ _ = NONE
fun z3_mk_builtin_num _ i T =
if T = @{typ real} then SOME (Numeral.mk_cnumber @{ctyp real} i)
else NONE
fun mk_nary _ cu [] = cu
| mk_nary ct _ cts = uncurry (fold_rev (Thm.mk_binop ct)) (split_last cts)
val mk_uminus = Thm.apply (Thm.cterm_of @{theory} @{const uminus (real)})
val add = Thm.cterm_of @{theory} @{const plus (real)}
val real0 = Numeral.mk_cnumber @{ctyp real} 0
val mk_sub = Thm.mk_binop (Thm.cterm_of @{theory} @{const minus (real)})
val mk_mul = Thm.mk_binop (Thm.cterm_of @{theory} @{const times (real)})
val mk_div = Thm.mk_binop (Thm.cterm_of @{theory} @{const divide (real)})
val mk_lt = Thm.mk_binop (Thm.cterm_of @{theory} @{const less (real)})
val mk_le = Thm.mk_binop (Thm.cterm_of @{theory} @{const less_eq (real)})
fun z3_mk_builtin_fun (Old_Z3_Interface.Sym ("-", _)) [ct] = SOME (mk_uminus ct)
| z3_mk_builtin_fun (Old_Z3_Interface.Sym ("+", _)) cts =
SOME (mk_nary add real0 cts)
| z3_mk_builtin_fun (Old_Z3_Interface.Sym ("-", _)) [ct, cu] =
SOME (mk_sub ct cu)
| z3_mk_builtin_fun (Old_Z3_Interface.Sym ("*", _)) [ct, cu] =
SOME (mk_mul ct cu)
| z3_mk_builtin_fun (Old_Z3_Interface.Sym ("/", _)) [ct, cu] =
SOME (mk_div ct cu)
| z3_mk_builtin_fun (Old_Z3_Interface.Sym ("<", _)) [ct, cu] =
SOME (mk_lt ct cu)
| z3_mk_builtin_fun (Old_Z3_Interface.Sym ("<=", _)) [ct, cu] =
SOME (mk_le ct cu)
| z3_mk_builtin_fun (Old_Z3_Interface.Sym (">", _)) [ct, cu] =
SOME (mk_lt cu ct)
| z3_mk_builtin_fun (Old_Z3_Interface.Sym (">=", _)) [ct, cu] =
SOME (mk_le cu ct)
| z3_mk_builtin_fun _ _ = NONE
in
val z3_mk_builtins = {
mk_builtin_typ = z3_mk_builtin_typ,
mk_builtin_num = z3_mk_builtin_num,
mk_builtin_fun = (fn _ => fn sym => fn cts =>
(case try (#T o Thm.rep_cterm o hd) cts of
SOME @{typ real} => z3_mk_builtin_fun sym cts
| _ => NONE)) }
end
(* Z3 proof reconstruction *)
val real_rules = @{lemma
"0 + (x::real) = x"
"x + 0 = x"
"0 * x = 0"
"1 * x = x"
"x + y = y + x"
by auto}
val real_linarith_proc = Simplifier.simproc_global @{theory} "fast_real_arith" [
"(m::real) < n", "(m::real) <= n", "(m::real) = n"] Lin_Arith.simproc
(* setup *)
val setup =
Context.theory_map (
Old_SMTLIB_Interface.add_logic (10, smtlib_logic) #>
setup_builtins #>
Old_Z3_Interface.add_mk_builtins z3_mk_builtins #>
fold Old_Z3_Proof_Reconstruction.add_z3_rule real_rules #>
Old_Z3_Proof_Tools.add_simproc real_linarith_proc)
end