(* *********************************************************************) (* *) (* The Compcert verified compiler *) (* *) (* Xavier Leroy, INRIA Paris-Rocquencourt *) (* *) (* Copyright Institut National de Recherche en Informatique et en *) (* Automatique. All rights reserved. This file is distributed *) (* under the terms of the INRIA Non-Commercial License Agreement. *) (* *) (* *********************************************************************) (** Instruction selection for 64-bit integer operations *) Require Import Coqlib. Require Import AST. Require Import Integers. Require Import Floats. Require Import Op. Require Import CminorSel. Require Import SelectOp. Open Local Scope cminorsel_scope. (** Some operations on 64-bit integers are transformed into calls to runtime library functions. The following record type collects the names of these functions. *) Record helper_functions : Type := mk_helper_functions { i64_dtos: ident; (**r float -> signed long *) i64_dtou: ident; (**r float -> unsigned long *) i64_stod: ident; (**r signed long -> float *) i64_utod: ident; (**r unsigned long -> float *) i64_stof: ident; (**r signed long -> float32 *) i64_utof: ident; (**r unsigned long -> float32 *) i64_neg: ident; (**r opposite *) i64_add: ident; (**r addition *) i64_sub: ident; (**r subtraction *) i64_mul: ident; (**r multiplication 32x32->64 *) i64_sdiv: ident; (**r signed division *) i64_udiv: ident; (**r unsigned division *) i64_smod: ident; (**r signed remainder *) i64_umod: ident; (**r unsigned remainder *) i64_shl: ident; (**r shift left *) i64_shr: ident; (**r shift right unsigned *) i64_sar: ident (**r shift right signed *) }. Definition sig_l_l := mksignature (Tlong :: nil) (Some Tlong). Definition sig_l_f := mksignature (Tlong :: nil) (Some Tfloat). Definition sig_l_s := mksignature (Tlong :: nil) (Some Tsingle). Definition sig_f_l := mksignature (Tfloat :: nil) (Some Tlong). Definition sig_ll_l := mksignature (Tlong :: Tlong :: nil) (Some Tlong). Definition sig_li_l := mksignature (Tlong :: Tint :: nil) (Some Tlong). Definition sig_ii_l := mksignature (Tint :: Tint :: nil) (Some Tlong). Section SELECT. Variable hf: helper_functions. Definition makelong (h l: expr): expr := Eop Omakelong (h ::: l ::: Enil). (** Original definition: << Nondetfunction splitlong (e: expr) (f: expr -> expr -> expr) := match e with | Eop Omakelong (h ::: l ::: Enil) => f h l | _ => Elet e (f (Eop Ohighlong (Eletvar O ::: Enil)) (Eop Olowlong (Eletvar O ::: Enil))) end. >> *) Inductive splitlong_cases: forall (e: expr) , Type := | splitlong_case1: forall h l, splitlong_cases (Eop Omakelong (h ::: l ::: Enil)) | splitlong_default: forall (e: expr) , splitlong_cases e. Definition splitlong_match (e: expr) := match e as zz1 return splitlong_cases zz1 with | Eop Omakelong (h ::: l ::: Enil) => splitlong_case1 h l | e => splitlong_default e end. Definition splitlong (e: expr) (f: expr -> expr -> expr) := match splitlong_match e with | splitlong_case1 h l => (* Eop Omakelong (h ::: l ::: Enil) *) f h l | splitlong_default e => Elet e (f (Eop Ohighlong (Eletvar O ::: Enil)) (Eop Olowlong (Eletvar O ::: Enil))) end. (** Original definition: << Nondetfunction splitlong2 (e1 e2: expr) (f: expr -> expr -> expr -> expr -> expr) := match e1, e2 with | Eop Omakelong (h1 ::: l1 ::: Enil), Eop Omakelong (h2 ::: l2 ::: Enil) => f h1 l1 h2 l2 | Eop Omakelong (h1 ::: l1 ::: Enil), t2 => Elet t2 (f (lift h1) (lift l1) (Eop Ohighlong (Eletvar O ::: Enil)) (Eop Olowlong (Eletvar O ::: Enil))) | t1, Eop Omakelong (h2 ::: l2 ::: Enil) => Elet t1 (f (Eop Ohighlong (Eletvar O ::: Enil)) (Eop Olowlong (Eletvar O ::: Enil)) (lift h2) (lift l2)) | _, _ => Elet e1 (Elet (lift e2) (f (Eop Ohighlong (Eletvar 1 ::: Enil)) (Eop Olowlong (Eletvar 1 ::: Enil)) (Eop Ohighlong (Eletvar O ::: Enil)) (Eop Olowlong (Eletvar O ::: Enil)))) end. >> *) Inductive splitlong2_cases: forall (e1 e2: expr) , Type := | splitlong2_case1: forall h1 l1 h2 l2, splitlong2_cases (Eop Omakelong (h1 ::: l1 ::: Enil)) (Eop Omakelong (h2 ::: l2 ::: Enil)) | splitlong2_case2: forall h1 l1 t2, splitlong2_cases (Eop Omakelong (h1 ::: l1 ::: Enil)) (t2) | splitlong2_case3: forall t1 h2 l2, splitlong2_cases (t1) (Eop Omakelong (h2 ::: l2 ::: Enil)) | splitlong2_default: forall (e1 e2: expr) , splitlong2_cases e1 e2. Definition splitlong2_match (e1 e2: expr) := match e1 as zz1, e2 as zz2 return splitlong2_cases zz1 zz2 with | Eop Omakelong (h1 ::: l1 ::: Enil), Eop Omakelong (h2 ::: l2 ::: Enil) => splitlong2_case1 h1 l1 h2 l2 | Eop Omakelong (h1 ::: l1 ::: Enil), t2 => splitlong2_case2 h1 l1 t2 | t1, Eop Omakelong (h2 ::: l2 ::: Enil) => splitlong2_case3 t1 h2 l2 | e1, e2 => splitlong2_default e1 e2 end. Definition splitlong2 (e1 e2: expr) (f: expr -> expr -> expr -> expr -> expr) := match splitlong2_match e1 e2 with | splitlong2_case1 h1 l1 h2 l2 => (* Eop Omakelong (h1 ::: l1 ::: Enil), Eop Omakelong (h2 ::: l2 ::: Enil) *) f h1 l1 h2 l2 | splitlong2_case2 h1 l1 t2 => (* Eop Omakelong (h1 ::: l1 ::: Enil), t2 *) Elet t2 (f (lift h1) (lift l1) (Eop Ohighlong (Eletvar O ::: Enil)) (Eop Olowlong (Eletvar O ::: Enil))) | splitlong2_case3 t1 h2 l2 => (* t1, Eop Omakelong (h2 ::: l2 ::: Enil) *) Elet t1 (f (Eop Ohighlong (Eletvar O ::: Enil)) (Eop Olowlong (Eletvar O ::: Enil)) (lift h2) (lift l2)) | splitlong2_default e1 e2 => Elet e1 (Elet (lift e2) (f (Eop Ohighlong (Eletvar 1 ::: Enil)) (Eop Olowlong (Eletvar 1 ::: Enil)) (Eop Ohighlong (Eletvar O ::: Enil)) (Eop Olowlong (Eletvar O ::: Enil)))) end. (** Original definition: << Nondetfunction lowlong (e: expr) := match e with | Eop Omakelong (e1 ::: e2 ::: Enil) => e2 | _ => Eop Olowlong (e ::: Enil) end. >> *) Inductive lowlong_cases: forall (e: expr), Type := | lowlong_case1: forall e1 e2, lowlong_cases (Eop Omakelong (e1 ::: e2 ::: Enil)) | lowlong_default: forall (e: expr), lowlong_cases e. Definition lowlong_match (e: expr) := match e as zz1 return lowlong_cases zz1 with | Eop Omakelong (e1 ::: e2 ::: Enil) => lowlong_case1 e1 e2 | e => lowlong_default e end. Definition lowlong (e: expr) := match lowlong_match e with | lowlong_case1 e1 e2 => (* Eop Omakelong (e1 ::: e2 ::: Enil) *) e2 | lowlong_default e => Eop Olowlong (e ::: Enil) end. (** Original definition: << Nondetfunction highlong (e: expr) := match e with | Eop Omakelong (e1 ::: e2 ::: Enil) => e1 | _ => Eop Ohighlong (e ::: Enil) end. >> *) Inductive highlong_cases: forall (e: expr), Type := | highlong_case1: forall e1 e2, highlong_cases (Eop Omakelong (e1 ::: e2 ::: Enil)) | highlong_default: forall (e: expr), highlong_cases e. Definition highlong_match (e: expr) := match e as zz1 return highlong_cases zz1 with | Eop Omakelong (e1 ::: e2 ::: Enil) => highlong_case1 e1 e2 | e => highlong_default e end. Definition highlong (e: expr) := match highlong_match e with | highlong_case1 e1 e2 => (* Eop Omakelong (e1 ::: e2 ::: Enil) *) e1 | highlong_default e => Eop Ohighlong (e ::: Enil) end. Definition longconst (n: int64) : expr := makelong (Eop (Ointconst (Int64.hiword n)) Enil) (Eop (Ointconst (Int64.loword n)) Enil). (** Original definition: << Nondetfunction is_longconst (e: expr) := match e with | Eop Omakelong (Eop (Ointconst h) Enil ::: Eop (Ointconst l) Enil ::: Enil) => Some(Int64.ofwords h l) | _ => None end. >> *) Inductive is_longconst_cases: forall (e: expr), Type := | is_longconst_case1: forall h l, is_longconst_cases (Eop Omakelong (Eop (Ointconst h) Enil ::: Eop (Ointconst l) Enil ::: Enil)) | is_longconst_default: forall (e: expr), is_longconst_cases e. Definition is_longconst_match (e: expr) := match e as zz1 return is_longconst_cases zz1 with | Eop Omakelong (Eop (Ointconst h) Enil ::: Eop (Ointconst l) Enil ::: Enil) => is_longconst_case1 h l | e => is_longconst_default e end. Definition is_longconst (e: expr) := match is_longconst_match e with | is_longconst_case1 h l => (* Eop Omakelong (Eop (Ointconst h) Enil ::: Eop (Ointconst l) Enil ::: Enil) *) Some(Int64.ofwords h l) | is_longconst_default e => None end. Definition is_longconst_zero (e: expr) := match is_longconst e with | Some n => Int64.eq n Int64.zero | None => false end. Definition intoflong (e: expr) := lowlong e. Definition longofint (e: expr) := Elet e (makelong (shrimm (Eletvar O) (Int.repr 31)) (Eletvar O)). Definition longofintu (e: expr) := makelong (Eop (Ointconst Int.zero) Enil) e. Definition negl (e: expr) := match is_longconst e with | Some n => longconst (Int64.neg n) | None => Ebuiltin (EF_builtin hf.(i64_neg) sig_l_l) (e ::: Enil) end. Definition notl (e: expr) := splitlong e (fun h l => makelong (notint h) (notint l)). Definition longoffloat (arg: expr) := Eexternal hf.(i64_dtos) sig_f_l (arg ::: Enil). Definition longuoffloat (arg: expr) := Eexternal hf.(i64_dtou) sig_f_l (arg ::: Enil). Definition floatoflong (arg: expr) := Eexternal hf.(i64_stod) sig_l_f (arg ::: Enil). Definition floatoflongu (arg: expr) := Eexternal hf.(i64_utod) sig_l_f (arg ::: Enil). Definition singleoflong (arg: expr) := Eexternal hf.(i64_stof) sig_l_s (arg ::: Enil). Definition singleoflongu (arg: expr) := Eexternal hf.(i64_utof) sig_l_s (arg ::: Enil). Definition andl (e1 e2: expr) := splitlong2 e1 e2 (fun h1 l1 h2 l2 => makelong (and h1 h2) (and l1 l2)). Definition orl (e1 e2: expr) := splitlong2 e1 e2 (fun h1 l1 h2 l2 => makelong (or h1 h2) (or l1 l2)). Definition xorl (e1 e2: expr) := splitlong2 e1 e2 (fun h1 l1 h2 l2 => makelong (xor h1 h2) (xor l1 l2)). Definition shllimm (e1: expr) (n: int) := if Int.eq n Int.zero then e1 else if Int.ltu n Int.iwordsize then splitlong e1 (fun h l => makelong (or (shlimm h n) (shruimm l (Int.sub Int.iwordsize n))) (shlimm l n)) else if Int.ltu n Int64.iwordsize' then makelong (shlimm (lowlong e1) (Int.sub n Int.iwordsize)) (Eop (Ointconst Int.zero) Enil) else Eexternal hf.(i64_shl) sig_li_l (e1 ::: Eop (Ointconst n) Enil ::: Enil). Definition shrluimm (e1: expr) (n: int) := if Int.eq n Int.zero then e1 else if Int.ltu n Int.iwordsize then splitlong e1 (fun h l => makelong (shruimm h n) (or (shruimm l n) (shlimm h (Int.sub Int.iwordsize n)))) else if Int.ltu n Int64.iwordsize' then makelong (Eop (Ointconst Int.zero) Enil) (shruimm (highlong e1) (Int.sub n Int.iwordsize)) else Eexternal hf.(i64_shr) sig_li_l (e1 ::: Eop (Ointconst n) Enil ::: Enil). Definition shrlimm (e1: expr) (n: int) := if Int.eq n Int.zero then e1 else if Int.ltu n Int.iwordsize then splitlong e1 (fun h l => makelong (shrimm h n) (or (shruimm l n) (shlimm h (Int.sub Int.iwordsize n)))) else if Int.ltu n Int64.iwordsize' then Elet (highlong e1) (makelong (shrimm (Eletvar 0) (Int.repr 31)) (shrimm (Eletvar 0) (Int.sub n Int.iwordsize))) else Eexternal hf.(i64_sar) sig_li_l (e1 ::: Eop (Ointconst n) Enil ::: Enil). Definition is_intconst (e: expr) := match e with | Eop (Ointconst n) Enil => Some n | _ => None end. Definition shll (e1 e2: expr) := match is_intconst e2 with | Some n => shllimm e1 n | None => Eexternal hf.(i64_shl) sig_li_l (e1 ::: e2 ::: Enil) end. Definition shrlu (e1 e2: expr) := match is_intconst e2 with | Some n => shrluimm e1 n | None => Eexternal hf.(i64_shr) sig_li_l (e1 ::: e2 ::: Enil) end. Definition shrl (e1 e2: expr) := match is_intconst e2 with | Some n => shrlimm e1 n | None => Eexternal hf.(i64_sar) sig_li_l (e1 ::: e2 ::: Enil) end. Definition addl (e1 e2: expr) := let default := Ebuiltin (EF_builtin hf.(i64_add) sig_ll_l) (e1 ::: e2 ::: Enil) in match is_longconst e1, is_longconst e2 with | Some n1, Some n2 => longconst (Int64.add n1 n2) | Some n1, _ => if Int64.eq n1 Int64.zero then e2 else default | _, Some n2 => if Int64.eq n2 Int64.zero then e1 else default | _, _ => default end. Definition subl (e1 e2: expr) := let default := Ebuiltin (EF_builtin hf.(i64_sub) sig_ll_l) (e1 ::: e2 ::: Enil) in match is_longconst e1, is_longconst e2 with | Some n1, Some n2 => longconst (Int64.sub n1 n2) | Some n1, _ => if Int64.eq n1 Int64.zero then negl e2 else default | _, Some n2 => if Int64.eq n2 Int64.zero then e1 else default | _, _ => default end. Definition mull_base (e1 e2: expr) := splitlong2 e1 e2 (fun h1 l1 h2 l2 => Elet (Ebuiltin (EF_builtin hf.(i64_mul) sig_ii_l) (l1 ::: l2 ::: Enil)) (makelong (add (add (Eop Ohighlong (Eletvar O ::: Enil)) (mul (lift l1) (lift h2))) (mul (lift h1) (lift l2))) (Eop Olowlong (Eletvar O ::: Enil)))). Definition mullimm (e: expr) (n: int64) := if Int64.eq n Int64.zero then longconst Int64.zero else if Int64.eq n Int64.one then e else match Int64.is_power2 n with | Some l => shllimm e (Int.repr (Int64.unsigned l)) | None => mull_base e (longconst n) end. Definition mull (e1 e2: expr) := match is_longconst e1, is_longconst e2 with | Some n1, Some n2 => longconst (Int64.mul n1 n2) | Some n1, _ => mullimm e2 n1 | _, Some n2 => mullimm e1 n2 | _, _ => mull_base e1 e2 end. Definition binop_long (id: ident) (sem: int64 -> int64 -> int64) (e1 e2: expr) := match is_longconst e1, is_longconst e2 with | Some n1, Some n2 => longconst (sem n1 n2) | _, _ => Eexternal id sig_ll_l (e1 ::: e2 ::: Enil) end. Definition divl := binop_long hf.(i64_sdiv) Int64.divs. Definition modl := binop_long hf.(i64_smod) Int64.mods. Definition divlu (e1 e2: expr) := let default := Eexternal hf.(i64_udiv) sig_ll_l (e1 ::: e2 ::: Enil) in match is_longconst e1, is_longconst e2 with | Some n1, Some n2 => longconst (Int64.divu n1 n2) | _, Some n2 => match Int64.is_power2 n2 with | Some l => shrluimm e1 (Int.repr (Int64.unsigned l)) | None => default end | _, _ => default end. Definition modlu (e1 e2: expr) := let default := Eexternal hf.(i64_umod) sig_ll_l (e1 ::: e2 ::: Enil) in match is_longconst e1, is_longconst e2 with | Some n1, Some n2 => longconst (Int64.modu n1 n2) | _, Some n2 => match Int64.is_power2 n2 with | Some l => andl e1 (longconst (Int64.sub n2 Int64.one)) | None => default end | _, _ => default end. Definition cmpl_eq_zero (e: expr) := splitlong e (fun h l => comp Ceq (or h l) (Eop (Ointconst Int.zero) Enil)). Definition cmpl_ne_zero (e: expr) := splitlong e (fun h l => comp Cne (or h l) (Eop (Ointconst Int.zero) Enil)). Definition cmplu_gen (ch cl: comparison) (e1 e2: expr) := splitlong2 e1 e2 (fun h1 l1 h2 l2 => Econdition (CEcond (Ccomp Ceq) (h1:::h2:::Enil)) (Eop (Ocmp (Ccompu cl)) (l1:::l2:::Enil)) (Eop (Ocmp (Ccompu ch)) (h1:::h2:::Enil))). Definition cmplu (c: comparison) (e1 e2: expr) := match c with | Ceq => if is_longconst_zero e2 then cmpl_eq_zero e1 else cmpl_eq_zero (xorl e1 e2) | Cne => if is_longconst_zero e2 then cmpl_ne_zero e1 else cmpl_ne_zero (xorl e1 e2) | Clt => cmplu_gen Clt Clt e1 e2 | Cle => cmplu_gen Clt Cle e1 e2 | Cgt => cmplu_gen Cgt Cgt e1 e2 | Cge => cmplu_gen Cgt Cge e1 e2 end. Definition cmpl_gen (ch cl: comparison) (e1 e2: expr) := splitlong2 e1 e2 (fun h1 l1 h2 l2 => Econdition (CEcond (Ccomp Ceq) (h1:::h2:::Enil)) (Eop (Ocmp (Ccompu cl)) (l1:::l2:::Enil)) (Eop (Ocmp (Ccomp ch)) (h1:::h2:::Enil))). Definition cmpl (c: comparison) (e1 e2: expr) := match c with | Ceq => if is_longconst_zero e2 then cmpl_eq_zero e1 else cmpl_eq_zero (xorl e1 e2) | Cne => if is_longconst_zero e2 then cmpl_ne_zero e1 else cmpl_ne_zero (xorl e1 e2) | Clt => if is_longconst_zero e2 then comp Clt (highlong e1) (Eop (Ointconst Int.zero) Enil) else cmpl_gen Clt Clt e1 e2 | Cle => cmpl_gen Clt Cle e1 e2 | Cgt => cmpl_gen Cgt Cgt e1 e2 | Cge => if is_longconst_zero e2 then comp Cge (highlong e1) (Eop (Ointconst Int.zero) Enil) else cmpl_gen Cgt Cge e1 e2 end. End SELECT. (** Setting up the helper functions *) Require Import Errors. Local Open Scope string_scope. Local Open Scope error_monad_scope. Parameter get_helper: Cminor.genv -> String.string -> signature -> res ident. Parameter get_builtin: String.string -> signature -> res ident. Definition get_helpers (ge: Cminor.genv): res helper_functions := do i64_dtos <- get_helper ge "__i64_dtos" sig_f_l ; do i64_dtou <- get_helper ge "__i64_dtou" sig_f_l ; do i64_stod <- get_helper ge "__i64_stod" sig_l_f ; do i64_utod <- get_helper ge "__i64_utod" sig_l_f ; do i64_stof <- get_helper ge "__i64_stof" sig_l_s ; do i64_utof <- get_helper ge "__i64_utof" sig_l_s ; do i64_neg <- get_builtin "__builtin_negl" sig_l_l ; do i64_add <- get_builtin "__builtin_addl" sig_ll_l ; do i64_sub <- get_builtin "__builtin_subl" sig_ll_l ; do i64_mul <- get_builtin "__builtin_mull" sig_ll_l ; do i64_sdiv <- get_helper ge "__i64_sdiv" sig_ll_l ; do i64_udiv <- get_helper ge "__i64_udiv" sig_ll_l ; do i64_smod <- get_helper ge "__i64_smod" sig_ll_l ; do i64_umod <- get_helper ge "__i64_umod" sig_ll_l ; do i64_shl <- get_helper ge "__i64_shl" sig_li_l ; do i64_shr <- get_helper ge "__i64_shr" sig_li_l ; do i64_sar <- get_helper ge "__i64_sar" sig_li_l ; OK (mk_helper_functions i64_dtos i64_dtou i64_stod i64_utod i64_stof i64_utof i64_neg i64_add i64_sub i64_mul i64_sdiv i64_udiv i64_smod i64_umod i64_shl i64_shr i64_sar).