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361 lines
12 KiB
OCaml
361 lines
12 KiB
OCaml
(*
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* Copyright (c) 1997-1999 Massachusetts Institute of Technology
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* Copyright (c) 2003, 2007-14 Matteo Frigo
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* Copyright (c) 2003, 2007-14 Massachusetts Institute of Technology
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*
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* This program is free software; you can redistribute it and/or modify
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* it under the terms of the GNU General Public License as published by
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* the Free Software Foundation; either version 2 of the License, or
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* (at your option) any later version.
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*
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* This program is distributed in the hope that it will be useful,
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* but WITHOUT ANY WARRANTY; without even the implied warranty of
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* MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE. See the
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* GNU General Public License for more details.
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*
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* You should have received a copy of the GNU General Public License
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* along with this program; if not, write to the Free Software
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* Foundation, Inc., 51 Franklin Street, Fifth Floor, Boston, MA 02110-1301 USA
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*
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*)
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(* Here, we take a schedule (produced by schedule.ml) ordering a
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sequence of instructions, and produce an annotated schedule. The
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annotated schedule has the same ordering as the original schedule,
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but is additionally partitioned into nested blocks of temporary
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variables. The partitioning is computed via a heuristic algorithm.
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The blocking allows the C code that we generate to consist of
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nested blocks that help communicate variable lifetimes to the
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compiler. *)
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open Schedule
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open Expr
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open Variable
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type annotated_schedule =
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Annotate of variable list * variable list * variable list * int * aschedule
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and aschedule =
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ADone
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| AInstr of assignment
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| ASeq of (annotated_schedule * annotated_schedule)
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let addelem a set = if not (List.memq a set) then a :: set else set
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let union l =
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let f x = addelem x (* let is source of polymorphism *)
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in List.fold_right f l
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(* set difference a - b *)
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let diff a b = List.filter (fun x -> not (List.memq x b)) a
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let rec minimize f = function
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[] -> failwith "minimize"
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| [n] -> n
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| n :: rest ->
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let x = minimize f rest in
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if (f x) >= (f n) then n else x
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(* find all variables used inside a scheduling unit *)
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let rec find_block_vars = function
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Done -> []
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| (Instr (Assign (v, x))) -> v :: (find_vars x)
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| Par a -> List.flatten (List.map find_block_vars a)
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| Seq (a, b) -> (find_block_vars a) @ (find_block_vars b)
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let uniq l =
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List.fold_right (fun a b -> if List.memq a b then b else a :: b) l []
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let has_related x = List.exists (Variable.same_class x)
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let rec overlap a b = Util.count (fun y -> has_related y b) a
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(* reorder a list of schedules so as to maximize overlap of variables *)
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let reorder l =
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let rec loop = function
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[] -> []
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| (a, va) :: b ->
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let c =
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List.map
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(fun (a, x) -> ((a, x), (overlap va x, List.length x))) b in
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let c' =
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List.sort
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(fun (_, (a, la)) (_, (b, lb)) ->
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if la < lb || a > b then -1 else 1)
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c in
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let b' = List.map (fun (a, _) -> a) c' in
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a :: (loop b') in
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let l' = List.map (fun x -> x, uniq (find_block_vars x)) l in
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(* start with smallest block --- does this matter ? *)
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match l' with
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[] -> []
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| _ ->
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let m = minimize (fun (_, x) -> (List.length x)) l' in
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let l'' = Util.remove m l' in
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loop (m :: l'')
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(* remove Par blocks *)
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let rec linearize = function
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| Seq (a, Done) -> linearize a
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| Seq (Done, a) -> linearize a
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| Seq (a, b) -> Seq (linearize a, linearize b)
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(* try to balance nested Par blocks *)
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| Par [a] -> linearize a
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| Par l ->
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let n2 = (List.length l) / 2 in
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let rec loop n a b =
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if n = 0 then
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(List.rev b, a)
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else
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match a with
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[] -> failwith "loop"
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| x :: y -> loop (n - 1) y (x :: b)
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in let (a, b) = loop n2 (reorder l) []
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in linearize (Seq (Par a, Par b))
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| x -> x
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let subset a b =
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List.for_all (fun x -> List.exists (fun y -> x == y) b) a
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let use_same_vars (Assign (av, ax)) (Assign (bv, bx)) =
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is_temporary av &&
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is_temporary bv &&
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(let va = Expr.find_vars ax and vb = Expr.find_vars bx in
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subset va vb && subset vb va)
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let store_to_same_class (Assign (av, ax)) (Assign (bv, bx)) =
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is_locative av &&
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is_locative bv &&
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Variable.same_class av bv
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let loads_from_same_class (Assign (av, ax)) (Assign (bv, bx)) =
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match (ax, bx) with
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| (Load a), (Load b) when
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Variable.is_locative a && Variable.is_locative b
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-> Variable.same_class a b
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| _ -> false
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(* extract instructions from schedule *)
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let rec sched_to_ilist = function
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| Done -> []
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| Instr a -> [a]
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| Seq (a, b) -> (sched_to_ilist a) @ (sched_to_ilist b)
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| _ -> failwith "sched_to_ilist" (* Par blocks removed by linearize *)
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let rec find_friends friendp insn friends foes = function
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| [] -> (friends, foes)
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| a :: b ->
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if (a == insn) || (friendp a insn) then
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find_friends friendp insn (a :: friends) foes b
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else
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find_friends friendp insn friends (a :: foes) b
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(* schedule all instructions in the equivalence class determined
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by friendp at the point where the last one
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is executed *)
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let rec delay_friends friendp sched =
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let rec recur insns = function
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| Done -> (Done, insns)
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| Instr a ->
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let (friends, foes) = find_friends friendp a [] [] insns in
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(Schedule.sequentially friends), foes
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| Seq (a, b) ->
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let (b', insnsb) = recur insns b in
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let (a', insnsa) = recur insnsb a in
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(Seq (a', b')), insnsa
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| _ -> failwith "delay_friends"
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in match recur (sched_to_ilist sched) sched with
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| (s, []) -> s (* assert that all insns have been used *)
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| _ -> failwith "delay_friends"
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(* schedule all instructions in the equivalence class determined
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by friendp at the point where the first one
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is executed *)
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let rec anticipate_friends friendp sched =
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let rec recur insns = function
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| Done -> (Done, insns)
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| Instr a ->
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let (friends, foes) = find_friends friendp a [] [] insns in
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(Schedule.sequentially friends), foes
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| Seq (a, b) ->
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let (a', insnsa) = recur insns a in
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let (b', insnsb) = recur insnsa b in
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(Seq (a', b')), insnsb
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| _ -> failwith "anticipate_friends"
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in match recur (sched_to_ilist sched) sched with
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| (s, []) -> s (* assert that all insns have been used *)
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| _ -> failwith "anticipate_friends"
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let collect_buddy_stores buddy_list sched =
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let rec recur sched delayed_stores = match sched with
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| Done -> (sched, delayed_stores)
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| Instr (Assign (v, x)) ->
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begin
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try
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let buddies = List.find (List.memq v) buddy_list in
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let tmp = Variable.make_temporary () in
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let i = Seq(Instr (Assign (tmp, x)),
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Instr (Assign (v, Times (NaN MULTI_A, Load tmp))))
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and delayed_stores = (v, Load tmp) :: delayed_stores in
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try
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(Seq (i,
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Instr (Assign
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(List.hd buddies,
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Times (NaN MULTI_B,
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Plus (List.map
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(fun buddy ->
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List.assq buddy
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delayed_stores)
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buddies))) )))
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, delayed_stores
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with Not_found -> (i, delayed_stores)
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with Not_found -> (sched, delayed_stores)
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end
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| Seq (a, b) ->
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let (newa, delayed_stores) = recur a delayed_stores in
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let (newb, delayed_stores) = recur b delayed_stores in
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(Seq (newa, newb), delayed_stores)
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| _ -> failwith "collect_buddy_stores"
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in let (sched, _) = recur sched [] in
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sched
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let schedule_for_pipeline sched =
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let update_readytimes t (Assign (v, _)) ready_times =
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(v, (t + !Magic.pipeline_latency)) :: ready_times
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and readyp t ready_times (Assign (_, x)) =
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List.for_all
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(fun var ->
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try
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(List.assq var ready_times) <= t
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with Not_found -> false)
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(List.filter Variable.is_temporary (Expr.find_vars x))
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in
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let rec recur sched t ready_times delayed_instructions =
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let (ready, not_ready) =
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List.partition (readyp t ready_times) delayed_instructions
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in match ready with
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| a :: b ->
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let (sched, t, ready_times, delayed_instructions) =
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recur sched (t+1) (update_readytimes t a ready_times)
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(b @ not_ready)
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in
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(Seq (Instr a, sched)), t, ready_times, delayed_instructions
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| _ -> (match sched with
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| Done -> (sched, t, ready_times, delayed_instructions)
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| Instr a ->
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if (readyp t ready_times a) then
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(sched, (t+1), (update_readytimes t a ready_times),
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delayed_instructions)
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else
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(Done, t, ready_times, (a :: delayed_instructions))
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| Seq (a, b) ->
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let (a, t, ready_times, delayed_instructions) =
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recur a t ready_times delayed_instructions
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in
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let (b, t, ready_times, delayed_instructions) =
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recur b t ready_times delayed_instructions
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in (Seq (a, b)), t, ready_times, delayed_instructions
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| _ -> failwith "schedule_for_pipeline")
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in let rec recur_until_done sched t ready_times delayed_instructions =
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let (sched, t, ready_times, delayed_instructions) =
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recur sched t ready_times delayed_instructions
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in match delayed_instructions with
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| [] -> sched
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| _ ->
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(Seq (sched,
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(recur_until_done Done (t+1) ready_times
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delayed_instructions)))
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in recur_until_done sched 0 [] []
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let rec rewrite_declarations force_declarations
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(Annotate (_, _, declared, _, what)) =
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let m = !Magic.number_of_variables in
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let declare_it declared =
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if (force_declarations || List.length declared >= m) then
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([], declared)
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else
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(declared, [])
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in match what with
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ADone -> Annotate ([], [], [], 0, what)
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| AInstr i ->
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let (u, d) = declare_it declared
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in Annotate ([], u, d, 0, what)
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| ASeq (a, b) ->
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let ma = rewrite_declarations false a
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and mb = rewrite_declarations false b
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in let Annotate (_, ua, _, _, _) = ma
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and Annotate (_, ub, _, _, _) = mb
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in let (u, d) = declare_it (declared @ ua @ ub)
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in Annotate ([], u, d, 0, ASeq (ma, mb))
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let annotate list_of_buddy_stores schedule =
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let rec analyze live_at_end = function
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Done -> Annotate (live_at_end, [], [], 0, ADone)
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| Instr i -> (match i with
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Assign (v, x) ->
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let vars = (find_vars x) in
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Annotate (Util.remove v (union live_at_end vars), [v], [],
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0, AInstr i))
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| Seq (a, b) ->
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let ab = analyze live_at_end b in
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let Annotate (live_at_begin_b, defined_b, _, depth_a, _) = ab in
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let aa = analyze live_at_begin_b a in
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let Annotate (live_at_begin_a, defined_a, _, depth_b, _) = aa in
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let defined = List.filter is_temporary (defined_a @ defined_b) in
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let declarable = diff defined live_at_end in
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let undeclarable = diff defined declarable
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and maxdepth = max depth_a depth_b in
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Annotate (live_at_begin_a, undeclarable, declarable,
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List.length declarable + maxdepth,
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ASeq (aa, ab))
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| _ -> failwith "really_analyze"
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in
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let () = Util.info "begin annotate" in
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let x = linearize schedule in
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let x =
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if (!Magic.schedule_for_pipeline && !Magic.pipeline_latency > 0) then
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schedule_for_pipeline x
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else
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x
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in
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let x =
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if !Magic.reorder_insns then
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linearize(anticipate_friends use_same_vars x)
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else
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x
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in
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(* delay stores to the real and imaginary parts of the same number *)
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let x =
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if !Magic.reorder_stores then
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linearize(delay_friends store_to_same_class x)
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else
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x
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in
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(* move loads of the real and imaginary parts of the same number *)
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let x =
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if !Magic.reorder_loads then
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linearize(anticipate_friends loads_from_same_class x)
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else
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x
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in
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let x = collect_buddy_stores list_of_buddy_stores x in
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let x = analyze [] x in
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let res = rewrite_declarations true x in
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let () = Util.info "end annotate" in
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res
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let rec dump print (Annotate (_, _, _, _, code)) =
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dump_code print code
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and dump_code print = function
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| ADone -> ()
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| AInstr x -> print ((assignment_to_string x) ^ "\n")
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| ASeq (a, b) -> dump print a; dump print b
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