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(*
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* Copyright (c) Facebook, Inc. and its affiliates.
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*
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* This source code is licensed under the MIT license found in the
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* LICENSE file in the root directory of this source tree.
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*)
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(* Define SSA form and the concept of variable liveness, and then show how SSA
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* simplifies it *)
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open HolKernel boolLib bossLib Parse;
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open pred_setTheory listTheory rich_listTheory;
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open settingsTheory miscTheory llvmTheory llvm_propTheory;
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new_theory "llvm_ssa";
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numLib.prefer_num ();
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(* ----- Static paths through a program *)
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Definition inc_pc_def:
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inc_pc ip = ip with i := inc_bip ip.i
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End
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(* The set of program counters the given instruction and starting point can
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* immediately reach, within a function *)
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Definition instr_next_ips_def:
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(instr_next_ips (Ret _) ip = {}) ∧
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(instr_next_ips (Br _ l1 l2) ip =
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{ <| f := ip.f; b := Some l; i := Phi_ip ip.b |> | l | l ∈ {l1; l2} }) ∧
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(instr_next_ips (Invoke _ _ _ _ l1 l2) ip =
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{ <| f := ip.f; b := Some l; i := Phi_ip ip.b |> | l | l ∈ {l1; l2} }) ∧
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(instr_next_ips Unreachable ip = {}) ∧
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(instr_next_ips Exit ip = {}) ∧
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(instr_next_ips (Sub _ _ _ _ _ _) ip = { inc_pc ip }) ∧
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(instr_next_ips (Extractvalue _ _ _) ip = { inc_pc ip }) ∧
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(instr_next_ips (Insertvalue _ _ _ _) ip = { inc_pc ip }) ∧
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(instr_next_ips (Alloca _ _ _) ip = { inc_pc ip }) ∧
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(instr_next_ips (Load _ _ _) ip = { inc_pc ip }) ∧
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(instr_next_ips (Store _ _) ip = { inc_pc ip }) ∧
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(instr_next_ips (Gep _ _ _ _) ip = { inc_pc ip }) ∧
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(instr_next_ips (Ptrtoint _ _ _) ip = { inc_pc ip }) ∧
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(instr_next_ips (Inttoptr _ _ _) ip = { inc_pc ip }) ∧
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(instr_next_ips (Icmp _ _ _ _ _) ip = { inc_pc ip }) ∧
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(instr_next_ips (Call _ _ _ _) ip = { inc_pc ip }) ∧
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(instr_next_ips (Cxa_allocate_exn _ _) ip = { inc_pc ip }) ∧
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(* TODO: revisit throw when dealing with exceptions *)
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(instr_next_ips (Cxa_throw _ _ _) ip = { }) ∧
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(instr_next_ips (Cxa_begin_catch _ _) ip = { inc_pc ip }) ∧
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(instr_next_ips (Cxa_end_catch) ip = { inc_pc ip }) ∧
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(instr_next_ips (Cxa_get_exception_ptr _ _) ip = { inc_pc ip })
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End
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Inductive next_ips:
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(∀prog ip i l.
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get_instr prog ip (Inl i) ∧
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l ∈ instr_next_ips i ip
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⇒
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next_ips prog ip l) ∧
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(∀prog ip from_l phis.
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get_instr prog ip (Inr (from_l, phis))
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⇒
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next_ips prog ip (inc_pc ip))
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End
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(* The path is a list of program counters that represent a statically feasible
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* path through a function *)
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Inductive good_path:
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(∀prog. good_path prog []) ∧
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(∀prog ip i.
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get_instr prog ip i
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⇒
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good_path prog [ip]) ∧
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(∀prog path ip1 ip2.
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ip2 ∈ next_ips prog ip1 ∧
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good_path prog (ip2::path)
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⇒
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good_path prog (ip1::ip2::path))
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End
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Theorem next_ips_same_func:
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∀prog ip1 ip2. ip2 ∈ next_ips prog ip1 ⇒ ip1.f = ip2.f
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Proof
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rw [next_ips_cases, IN_DEF, get_instr_cases, inc_pc_def, inc_bip_def] >> rw [] >>
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Cases_on `el idx b.body` >> fs [instr_next_ips_def, inc_pc_def, inc_bip_def]
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QED
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Theorem good_path_same_func:
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∀prog path. good_path prog path ⇒ ∀ip1 ip2. mem ip1 path ∧ mem ip2 path ⇒ ip1.f = ip2.f
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Proof
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ho_match_mp_tac good_path_ind >> rw [] >>
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metis_tac [next_ips_same_func]
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QED
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Theorem good_path_prefix:
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∀prog path path'. good_path prog path ∧ path' ≼ path ⇒ good_path prog path'
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Proof
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Induct_on `path'` >> rw []
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>- simp [Once good_path_cases] >>
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pop_assum mp_tac >> CASE_TAC >> rw [] >>
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qpat_x_assum `good_path _ _` mp_tac >>
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simp [Once good_path_cases] >> rw [] >> fs []
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>- (simp [Once good_path_cases] >> metis_tac []) >>
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first_x_assum drule >> rw [] >>
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simp [Once good_path_cases] >>
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Cases_on `path'` >> fs [next_ips_cases, IN_DEF] >>
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metis_tac []
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QED
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(* ----- Helper functions to get registers out of instructions ----- *)
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Definition arg_to_regs_def:
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(arg_to_regs (Constant _) = {}) ∧
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(arg_to_regs (Variable r) = {r})
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End
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(* The registers that an instruction uses *)
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Definition instr_uses_def:
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(instr_uses (Ret (_, a)) = arg_to_regs a) ∧
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(instr_uses (Br a _ _) = arg_to_regs a) ∧
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(instr_uses (Invoke _ _ a targs _ _) =
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arg_to_regs a ∪ BIGUNION (set (map (arg_to_regs o snd) targs))) ∧
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(instr_uses Unreachable = {}) ∧
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(instr_uses (Sub _ _ _ _ a1 a2) =
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arg_to_regs a1 ∪ arg_to_regs a2) ∧
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(instr_uses (Extractvalue _ (_, a) _) = arg_to_regs a) ∧
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(instr_uses (Insertvalue _ (_, a1) (_, a2) _) =
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arg_to_regs a1 ∪ arg_to_regs a2) ∧
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(instr_uses (Alloca _ _ (_, a)) = arg_to_regs a) ∧
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(instr_uses (Load _ _ (_, a)) = arg_to_regs a) ∧
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(instr_uses (Store (_, a1) (_, a2)) =
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arg_to_regs a1 ∪ arg_to_regs a2) ∧
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(instr_uses (Gep _ _ (_, a) targs) =
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arg_to_regs a ∪ BIGUNION (set (map (arg_to_regs o snd) targs))) ∧
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(instr_uses (Ptrtoint _ (_, a) _) = arg_to_regs a) ∧
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(instr_uses (Inttoptr _ (_, a) _) = arg_to_regs a) ∧
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(instr_uses (Icmp _ _ _ a1 a2) =
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arg_to_regs a1 ∪ arg_to_regs a2) ∧
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(instr_uses (Call _ _ _ targs) =
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BIGUNION (set (map (arg_to_regs o snd) targs))) ∧
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(instr_uses (Cxa_allocate_exn _ a) = arg_to_regs a) ∧
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(instr_uses (Cxa_throw a1 a2 a3) =
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arg_to_regs a1 ∪ arg_to_regs a2 ∪ arg_to_regs a3) ∧
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(instr_uses (Cxa_begin_catch _ a) = arg_to_regs a) ∧
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(instr_uses (Cxa_end_catch) = { }) ∧
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(instr_uses (Cxa_get_exception_ptr _ a) = arg_to_regs a)
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End
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Definition phi_uses_def:
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phi_uses from_l (Phi _ _ entries) =
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case alookup entries from_l of
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| None => {}
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| Some a => arg_to_regs a
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End
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Inductive uses:
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(∀prog ip i r.
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get_instr prog ip (Inl i) ∧
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r ∈ instr_uses i
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⇒
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uses prog ip r) ∧
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(∀prog ip from_l phis r.
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get_instr prog ip (Inr (from_l, phis)) ∧
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r ∈ BIGUNION (set (map (phi_uses from_l) phis))
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⇒
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uses prog ip r)
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End
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(* The registers that an instruction assigns *)
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Definition instr_assigns_def:
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(instr_assigns (Invoke r _ _ _ _ _) = {r}) ∧
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(instr_assigns (Sub r _ _ _ _ _) = {r}) ∧
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(instr_assigns (Extractvalue r _ _) = {r}) ∧
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(instr_assigns (Insertvalue r _ _ _) = {r}) ∧
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(instr_assigns (Alloca r _ _) = {r}) ∧
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(instr_assigns (Load r _ _) = {r}) ∧
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(instr_assigns (Gep r _ _ _) = {r}) ∧
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(instr_assigns (Ptrtoint r _ _) = {r}) ∧
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(instr_assigns (Inttoptr r _ _) = {r}) ∧
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(instr_assigns (Icmp r _ _ _ _) = {r}) ∧
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(instr_assigns (Call r _ _ _) = {r}) ∧
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(instr_assigns (Cxa_allocate_exn r _) = {r}) ∧
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(instr_assigns (Cxa_begin_catch r _) = {r}) ∧
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(instr_assigns (Cxa_get_exception_ptr r _) = {r}) ∧
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(instr_assigns _ = {})
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End
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Definition phi_assigns_def:
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phi_assigns (Phi r _ _) = {r}
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End
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Inductive assigns:
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(∀prog ip i r.
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get_instr prog ip (Inl i) ∧
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r ∈ instr_assigns i
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⇒
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assigns prog ip r) ∧
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(∀prog ip from_l phis r.
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get_instr prog ip (Inr (from_l, phis)) ∧
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r ∈ BIGUNION (set (map phi_assigns phis))
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⇒
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assigns prog ip r)
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End
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(* ----- SSA form ----- *)
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Definition entry_ip_def:
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entry_ip fname = <| f := fname; b := None; i := Offset 0 |>
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End
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Definition reachable_def:
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reachable prog ip ⇔
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∃path. good_path prog (entry_ip ip.f :: path) ∧ last (entry_ip ip.f :: path) = ip
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End
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(* To get to ip2 from the entry, you must go through ip1 *)
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Definition dominates_def:
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dominates prog ip1 ip2 ⇔
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∀path.
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good_path prog (entry_ip ip2.f :: path) ∧
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last (entry_ip ip2.f :: path) = ip2 ⇒
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mem ip1 (front (entry_ip ip2.f :: path))
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End
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Definition is_ssa_def:
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is_ssa prog ⇔
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(* Operate function by function *)
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(∀fname.
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(* No register is assigned in two different instructions *)
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(∀r ip1 ip2.
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r ∈ assigns prog ip1 ∧ r ∈ assigns prog ip2 ∧ ip1.f = fname ∧ ip2.f = fname
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⇒
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ip1 = ip2)) ∧
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(* Each use is dominated by its assignment *)
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(∀ip1 r. r ∈ uses prog ip1 ⇒ ∃ip2. r ∈ assigns prog ip2 ∧ dominates prog ip2 ip1)
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End
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Theorem dominates_trans:
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∀prog ip1 ip2 ip3.
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dominates prog ip1 ip2 ∧ dominates prog ip2 ip3 ⇒ dominates prog ip1 ip3
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Proof
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rw [dominates_def] >> simp [FRONT_DEF] >> rw []
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>- (first_x_assum (qspec_then `[]` mp_tac) >> rw []) >>
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first_x_assum drule >> rw [] >>
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qpat_x_assum `mem _ (front _)` mp_tac >>
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simp [Once MEM_EL] >> rw [] >> fs [EL_FRONT] >>
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first_x_assum (qspec_then `take n path` mp_tac) >> simp [LAST_DEF] >>
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rw [] >> fs [entry_ip_def]
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>- (fs [Once good_path_cases] >> rw [] >> fs [next_ips_cases, IN_DEF]) >>
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rfs [EL_CONS] >>
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`?m. n = Suc m` by (Cases_on `n` >> rw []) >>
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rw [] >> rfs [] >>
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`(el m path).f = ip3.f`
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by (
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irule good_path_same_func >>
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qexists_tac `<| f:= ip3.f; b := NONE; i := Offset 0|> :: path` >>
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qexists_tac `prog` >>
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conj_tac >- rw [EL_MEM] >>
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metis_tac [MEM_LAST]) >>
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fs [] >> qpat_x_assum `_ ⇒ _` mp_tac >> impl_tac
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>- (
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irule good_path_prefix >> HINT_EXISTS_TAC >> rw [] >>
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metis_tac [take_is_prefix]) >>
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rw [] >> drule MEM_FRONT >> rw [] >>
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fs [MEM_EL, LENGTH_FRONT] >> rfs [EL_TAKE] >> rw [] >>
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disj2_tac >> qexists_tac `n'` >> rw [] >>
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irule (GSYM EL_FRONT) >>
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rw [NULL_EQ, LENGTH_FRONT]
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QED
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Theorem dominates_unreachable:
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∀prog ip1 ip2. ¬reachable prog ip2 ⇒ dominates prog ip1 ip2
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Proof
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rw [dominates_def, reachable_def] >>
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metis_tac []
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QED
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Theorem dominates_antisym_lem:
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∀prog ip1 ip2. dominates prog ip1 ip2 ∧ dominates prog ip2 ip1 ⇒ ¬reachable prog ip1
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Proof
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rw [dominates_def, reachable_def] >> CCONTR_TAC >> fs [] >>
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Cases_on `ip1 = entry_ip ip1.f` >> fs []
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>- (
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first_x_assum (qspec_then `[]` mp_tac) >> rw [] >>
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fs [Once good_path_cases, IN_DEF, next_ips_cases] >>
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metis_tac []) >>
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`path ≠ []` by (Cases_on `path` >> fs []) >>
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`(OLEAST n. n < length path ∧ el n path = ip1) ≠ None`
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by (
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rw [whileTheory.OLEAST_EQ_NONE] >>
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qexists_tac `PRE (length path)` >> rw [] >>
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fs [LAST_DEF, LAST_EL] >>
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Cases_on `path` >> fs []) >>
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qabbrev_tac `path1 = splitAtPki (\n ip. ip = ip1) (\x y. x) path` >>
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first_x_assum (qspec_then `path1 ++ [ip1]` mp_tac) >>
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simp [] >>
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conj_asm1_tac >> rw []
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>- (
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irule good_path_prefix >>
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HINT_EXISTS_TAC >> rw [] >>
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unabbrev_all_tac >> rw [splitAtPki_EQN] >>
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CASE_TAC >> rw [] >>
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fs [whileTheory.OLEAST_EQ_SOME] >>
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rw [GSYM SNOC_APPEND, SNOC_EL_TAKE] >>
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metis_tac [take_is_prefix])
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>- rw [LAST_DEF] >>
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simp [GSYM SNOC_APPEND, FRONT_SNOC, FRONT_DEF] >>
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CCONTR_TAC >> fs [MEM_EL]
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>- (
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first_x_assum (qspec_then `[]` mp_tac) >>
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fs [entry_ip_def, Once good_path_cases, IN_DEF, next_ips_cases] >>
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metis_tac []) >>
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rw [] >>
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rename [`n1 < length _`, `last _ = el n path`] >>
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first_x_assum (qspec_then `take (Suc n1) path1` mp_tac) >> rw []
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>- (
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irule good_path_prefix >> HINT_EXISTS_TAC >> rw [entry_ip_def]
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>- (
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irule good_path_same_func >>
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qexists_tac `entry_ip (el n path).f::(path1 ++ [el n path])` >>
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qexists_tac `prog` >> rw [EL_MEM]) >>
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metis_tac [IS_PREFIX_APPEND3, take_is_prefix, IS_PREFIX_TRANS])
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>- (rw [LAST_DEF] >> fs []) >>
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rw [METIS_PROVE [] ``~x ∨ y ⇔ (x ⇒ y)``] >>
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simp [EL_FRONT] >>
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rename [`n2 < Suc _`] >>
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Cases_on `¬(0 < n2)` >> rw [EL_CONS]
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>- (
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fs [entry_ip_def] >>
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`(el n path).f = (el n1 path1).f` suffices_by metis_tac [] >>
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irule good_path_same_func >>
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qexists_tac `<|f := (el n path).f; b := None; i := Offset 0|> ::(path1 ++ [el n path])` >>
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qexists_tac `prog` >>
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rw [EL_MEM]) >>
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fs [EL_TAKE, Abbr `path1`, splitAtPki_EQN] >>
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CASE_TAC >> rw [] >> fs []
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>- metis_tac [] >>
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fs [whileTheory.OLEAST_EQ_SOME] >>
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rfs [LENGTH_TAKE] >>
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`PRE n2 < x` by decide_tac >>
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first_x_assum drule >>
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rw [EL_TAKE]
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QED
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Theorem dominates_antisym:
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∀prog ip1 ip2. reachable prog ip1 ∧ dominates prog ip1 ip2 ⇒ ¬dominates prog ip2 ip1
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Proof
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metis_tac [dominates_antisym_lem]
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QED
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Theorem dominates_irrefl:
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∀prog ip. reachable prog ip ⇒ ¬dominates prog ip ip
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Proof
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metis_tac [dominates_antisym]
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QED
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(* ----- Liveness ----- *)
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Definition live_def:
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live prog ip =
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{ r | ∃path.
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good_path prog (ip::path) ∧
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r ∈ uses prog (last (ip::path)) ∧
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∀ip2. ip2 ∈ set (front (ip::path)) ⇒ r ∉ assigns prog ip2 }
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End
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Theorem get_instr_live:
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∀prog ip instr.
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get_instr prog ip instr
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⇒
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uses prog ip ⊆ live prog ip
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Proof
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rw [live_def, SUBSET_DEF] >>
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qexists_tac `[]` >> rw [Once good_path_cases] >>
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qexists_tac `instr` >> simp [] >> metis_tac [IN_DEF]
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QED
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|
Triviality set_rw:
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|
∀s P. (∀x. x ∈ s ⇔ P x) ⇔ s = P
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Proof
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|
rw [] >> eq_tac >> rw [IN_DEF] >> metis_tac []
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QED
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|
Theorem live_gen_kill:
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|
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∀prog ip ip'.
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|
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live prog ip =
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|
|
BIGUNION {live prog ip' | ip' | ip' ∈ next_ips prog ip} DIFF assigns prog ip ∪ uses prog ip
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|
Proof
|
|
|
rw [live_def, EXTENSION] >> eq_tac >> rw []
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|
|
>- (
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|
|
Cases_on `path` >> fs [] >>
|
|
|
rename1 `ip::ip2::path` >>
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|
|
qpat_x_assum `good_path _ _` mp_tac >> simp [Once good_path_cases] >> rw [] >>
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|
|
Cases_on `x ∈ uses prog ip` >> fs [] >> simp [set_rw, PULL_EXISTS] >>
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|
|
qexists_tac `ip2` >> qexists_tac `path` >> rw [])
|
|
|
>- (
|
|
|
fs [] >>
|
|
|
qexists_tac `ip'::path` >> rw [] >>
|
|
|
simp [Once good_path_cases])
|
|
|
>- (
|
|
|
qexists_tac `[]` >> rw [] >>
|
|
|
fs [Once good_path_cases, uses_cases, IN_DEF] >>
|
|
|
metis_tac [])
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|
QED
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export_theory ();
|
