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5 years ago
(*
* Copyright (c) Facebook, Inc. and its affiliates.
*
* This source code is licensed under the MIT license found in the
* LICENSE file in the root directory of this source tree.
*)
(* Properties of the llair model *)
open HolKernel boolLib bossLib Parse;
open arithmeticTheory integerTheory integer_wordTheory wordsTheory listTheory;
open pred_setTheory finite_mapTheory;
5 years ago
open settingsTheory miscTheory llairTheory;
new_theory "llair_prop";
numLib.prefer_num ();
Theorem i2n_n2i:
!n size. 0 < size (nfits n size (i2n (n2i n size) = n))
Proof
rw [nfits_def, n2i_def, i2n_def] >> rw []
>- intLib.COOPER_TAC
>- (
`2 ** size n` by intLib.COOPER_TAC >> simp [INT_SUB] >>
Cases_on `n = 0` >> fs [] >>
`n - 2 ** size < n` suffices_by intLib.COOPER_TAC >>
irule SUB_LESS >> simp [])
>- (
`2 ** (size - 1) < 2 ** size` suffices_by intLib.COOPER_TAC >>
fs [])
QED
Theorem n2i_i2n:
!i size. 0 < size (ifits i size (n2i (i2n (IntV i size)) size) = IntV i size)
Proof
rw [ifits_def, n2i_def, i2n_def] >> rw [] >> fs []
>- (
eq_tac >> rw []
>- (
simp [intLib.COOPER_PROVE ``∀(x:int) y z. x - y = z x = y + z``] >>
`2 ** (size - 1) < 2 ** size` suffices_by intLib.COOPER_TAC >>
fs [INT_OF_NUM])
>- (
fs [intLib.COOPER_PROVE ``∀(x:int) y z. x - y = z x = y + z``] >>
fs [INT_OF_NUM] >>
`?j. i = -j` by intLib.COOPER_TAC >> rw [] >> fs [] >>
qpat_x_assum `_ Num _` mp_tac >>
fs [GSYM INT_OF_NUM] >>
ASM_REWRITE_TAC [GSYM INT_LE] >> rw [] >>
`2 ** size = 2 * 2 ** (size - 1)` by rw [GSYM EXP, ADD1] >> fs [] >>
intLib.COOPER_TAC)
>- intLib.COOPER_TAC)
>- (
eq_tac >> rw []
>- intLib.COOPER_TAC
>- intLib.COOPER_TAC >>
`0 i` by intLib.COOPER_TAC >>
fs [GSYM INT_OF_NUM] >>
`&(2 ** size) = 0` by intLib.COOPER_TAC >>
fs [])
>- (
eq_tac >> rw []
>- (
`2 ** size = 2 * 2 ** (size - 1)` by rw [GSYM EXP, ADD1] >> fs [] >>
intLib.COOPER_TAC)
>- intLib.COOPER_TAC
>- intLib.COOPER_TAC)
>- intLib.COOPER_TAC
QED
Theorem w2n_i2n:
∀w. w2n (w : 'a word) = i2n (IntV (w2i w) (dimindex (:'a)))
Proof
rw [i2n_def] >> Cases_on `w` >> fs []
>- (
`INT_MIN (:α) n`
by (
fs [w2i_def] >> rw [] >>
BasicProvers.EVERY_CASE_TAC >> fs [word_msb_n2w_numeric] >>
rfs []) >>
rw [w2i_n2w_neg, dimword_def, int_arithTheory.INT_NUM_SUB])
>- (
`n < INT_MIN (:'a)`
by (
fs [w2i_def] >> rw [] >>
BasicProvers.EVERY_CASE_TAC >> fs [word_msb_n2w_numeric] >>
rfs []) >>
rw [w2i_n2w_pos])
QED
Theorem w2i_n2w:
∀n. n < dimword (:'a) IntV (w2i (n2w n : 'a word)) (dimindex (:'a)) = n2i n (dimindex (:'a))
Proof
rw [n2i_def]
>- (
qspec_then `n` mp_tac w2i_n2w_neg >>
fs [dimword_def, INT_MIN_def] >> rw [GSYM INT_SUB])
>- (irule w2i_n2w_pos >> rw [INT_MIN_def])
QED
Theorem eval_exp_ignores_lem:
∀s1 e v. eval_exp s1 e v ∀s2. s1.locals = s2.locals eval_exp s2 e v
Proof
ho_match_mp_tac eval_exp_ind >>
rw [] >> simp [Once eval_exp_cases] >>
TRY (qexists_tac `vals` >> rw [] >> fs [LIST_REL_EL_EQN] >> NO_TAC) >>
TRY (fs [LIST_REL_EL_EQN] >> NO_TAC) >>
metis_tac []
QED
Theorem eval_exp_ignores:
∀s1 e v s2. s1.locals = s2.locals (eval_exp s1 e v eval_exp s2 e v)
Proof
metis_tac [eval_exp_ignores_lem]
QED
Definition exp_uses_def:
(exp_uses (Var x) = {x})
(exp_uses Nondet = {})
(exp_uses (Label _) = {})
(exp_uses (Splat e1 e2) = exp_uses e1 exp_uses e2)
(exp_uses (Memory e1 e2) = exp_uses e1 exp_uses e2)
(exp_uses (Concat es) = bigunion (set (map exp_uses es)))
(exp_uses (Integer _ _) = {})
(exp_uses (Eq e1 e2) = exp_uses e1 exp_uses e2)
(exp_uses (Lt e1 e2) = exp_uses e1 exp_uses e2)
(exp_uses (Ult e1 e2) = exp_uses e1 exp_uses e2)
(exp_uses (Sub _ e1 e2) = exp_uses e1 exp_uses e2)
(exp_uses (Record es) = bigunion (set (map exp_uses es)))
(exp_uses (Select e1 e2) = exp_uses e1 exp_uses e2)
(exp_uses (Update e1 e2 e3) = exp_uses e1 exp_uses e2 exp_uses e3)
(exp_uses (Convert _ _ _ e) = exp_uses e)
Termination
WF_REL_TAC `measure exp_size` >> rw [] >>
Induct_on `es` >> rw [exp_size_def] >> res_tac >> rw []
End
Theorem eval_exp_ignores_unused_lem:
∀s1 e v.
eval_exp s1 e v
∀s2. DRESTRICT s1.locals (exp_uses e) = DRESTRICT s2.locals (exp_uses e)
eval_exp s2 e v
Proof
ho_match_mp_tac eval_exp_ind >>
rw [exp_uses_def] >> simp [Once eval_exp_cases]
>- (
fs [DRESTRICT_EQ_DRESTRICT, EXTENSION, FDOM_DRESTRICT] >>
imp_res_tac FLOOKUP_SUBMAP >>
fs [FLOOKUP_DRESTRICT]) >>
fs [drestrict_union_eq]
>- metis_tac []
>- metis_tac []
>- (
rpt (pop_assum mp_tac) >>
qid_spec_tac `vals` >>
Induct_on `es` >> rw [] >> Cases_on `vals` >> rw [PULL_EXISTS] >> fs [] >>
rw [] >> fs [drestrict_union_eq] >>
rename [`v1++flat vs`] >>
first_x_assum (qspec_then `vs` mp_tac) >> rw [] >>
qexists_tac `v1 :: vals'` >> rw [])
>- metis_tac []
>- metis_tac []
>- metis_tac []
>- metis_tac []
>- (
rpt (pop_assum mp_tac) >>
qid_spec_tac `vals` >>
Induct_on `es` >> rw [] >> fs [drestrict_union_eq])
>- metis_tac []
>- metis_tac []
>- metis_tac []
>- metis_tac []
QED
Theorem eval_exp_ignores_unused:
∀s1 e v s2. DRESTRICT s1.locals (exp_uses e) = DRESTRICT s2.locals (exp_uses e) (eval_exp s1 e v eval_exp s2 e v)
Proof
metis_tac [eval_exp_ignores_unused_lem]
QED
(* Relate the semantics of Convert to something more closely following the
* implementation *)
Definition Zextract_def:
Zextract (:'a) z off len = &w2n ((len+off-1 -- off) (i2w z : 'a word))
End
Definition Zsigned_extract_def:
Zsigned_extract (:'a) z off len = w2i ((len+off-1 --- off) (i2w z : 'a word))
End
(*
* Some tests of extract and signed_extract in both HOL and OCaml to check that
* we are defining the same thing *)
(*
EVAL ``
let bp1 = 0b11001100w : word8 in
let bp2 = 0b01011011w : word8 in
let i1 = &(w2n bp1) in
let i2 = w2i bp1 in
let i3 = &(w2n bp2) in
Zextract (:128) i1 0 8 = i1
Zextract (:128) i2 0 8 = i1
Zextract (:128) i3 0 8 = i3
Zsigned_extract (:128) i1 0 8 = i2
Zsigned_extract (:128) i2 0 8 = i2
Zsigned_extract (:128) i3 0 8 = i3
Zextract (:128) i1 2 4 = 3
Zextract (:128) i2 2 4 = 3
Zextract (:128) i1 2 5 = 19
Zextract (:128) i2 2 5 = 19
Zextract (:128) i3 1 2 = 1
Zextract (:128) i3 1 3 = 5
Zsigned_extract (:128) i1 2 4 = 3
Zsigned_extract (:128) i2 2 4 = 3
Zsigned_extract (:128) i1 2 5 = -13
Zsigned_extract (:128) i2 2 5 = -13
Zsigned_extract (:128) i3 1 2 = 1
Zsigned_extract (:128) i3 1 3 = -3``
let i1 = Z.of_int 0b11001100 in
let i2 = Z.of_int (-52) in
let i3 = Z.of_int 0b01011011 in
Z.extract i1 0 8 = i1 &&
Z.extract i2 0 8 = i1 &&
Z.extract i3 0 8 = i3 &&
Z.signed_extract i1 0 8 = i2 &&
Z.signed_extract i2 0 8 = i2 &&
Z.signed_extract i3 0 8 = i3 &&
Z.extract i1 2 4 = Z.of_int 3 &&
Z.extract i2 2 4 = Z.of_int 3 &&
Z.extract i1 2 5 = Z.of_int 19 &&
Z.extract i2 2 5 = Z.of_int 19 &&
Z.extract i3 1 2 = Z.of_int 1 &&
Z.extract i3 1 3 = Z.of_int 5 &&
Z.signed_extract i1 2 4 = Z.of_int 3 &&
Z.signed_extract i2 2 4 = Z.of_int 3 &&
Z.signed_extract i1 2 5 = Z.of_int (-13) &&
Z.signed_extract i2 2 5 = Z.of_int (-13) &&
Z.signed_extract i3 1 2 = Z.of_int 1 &&
Z.signed_extract i3 1 3 = Z.of_int (-3);;
*)
Definition extract_def:
extract (:'a) unsigned bits z =
if unsigned then Zextract (:'a) z 0 bits else Zsigned_extract (:'a) z 0 bits
End
Definition simp_convert_def:
simp_convert (:'a) unsigned dst src arg =
case (dst, src, arg) of
| (IntegerT m, IntegerT n, Integer data _) =>
if ¬unsigned m n then (Integer data dst)
else Integer (extract (:'a) unsigned (MIN m n) data) dst
| _ =>
arg
End
Theorem Zextract0:
dimindex (:'b) dimindex (:'a)
Zextract (:'a) i 0 (dimindex (:'b)) = &w2n (i2w i : 'b word)
Proof
rw [Zextract_def] >>
`w2n ((dimindex (:β) 1 -- 0) (i2w i : 'a word)) =
w2n (w2w (i2w i : 'a word) : 'b word)`
by (
rw [w2n_w2w] >>
`dimindex (:'b) = dimindex (:'a)` by decide_tac >>
fs [WORD_ALL_BITS]) >>
rw [w2w_i2w]
QED
Theorem Zsigned_extract0:
dimindex (:'b) dimindex (:'a)
Zsigned_extract (:'a) i 0 (dimindex (:'b)) = w2i (i2w i : 'b word)
Proof
rw [Zsigned_extract_def] >>
rw [word_sign_extend_bits, word_sign_extend_def, ADD1] >>
`0 < dimindex (:'b) dimindex (:'b) - 1 + 1 = dimindex (:'b)` by decide_tac >>
`min (dimindex (:β)) (dimindex (:α)) = dimindex (:β)` by fs [MIN_DEF] >>
rw [] >>
`w2n ((dimindex (:β) 1 -- 0) (i2w i : 'a word)) =
w2n (w2w (i2w i : 'a word) : 'b word)`
by (
rw [w2n_w2w] >>
`dimindex (:'b) = dimindex (:'a)` by decide_tac >>
fs [WORD_ALL_BITS]) >>
rw [GSYM sw2sw_def, w2w_i2w] >>
rw [w21_sw2sw_extend]
QED
Theorem convert_implementation:
∀h unsigned dst src const i m n.
const = Integer i src
src = IntegerT n 0 < n
dst = IntegerT m
ifits i (sizeof_bits src)
dimindex (:'b) = min m n
dimindex (:'b) dimindex (:'a)
eval_exp h (Convert unsigned dst src const) =
eval_exp h (simp_convert (:'a) unsigned dst src const)
Proof
rw [EXTENSION, IN_DEF] >>
simp [simp_convert_def] >>
CASE_TAC >>
fs [METIS_PROVE [] ``¬(¬unsigned m n) (m n unsigned)``] >>
ONCE_REWRITE_TAC [eval_exp_cases] >>
fs [sizeof_bits_def] >>
ONCE_REWRITE_TAC [eval_exp_cases] >> rw [] >>
`truncate_2comp i n = i` by metis_tac [fits_ident] >>
rw [] >>
Cases_on `unsigned` >> fs [extract_def] >>
irule (METIS_PROVE [] ``y = z (x = y x = z)``) >> rw []
>- ( (* unsigned *)
drule Zextract0 >> rw [] >>
`min m n = n min m n = m` by rw [MIN_DEF]
>- ( (* zero extending *)
`truncate_2comp i n = w2i (i2w i : 'b word)` by metis_tac [truncate_2comp_i2w_w2i] >>
fs [] >>
qpat_x_assum `w2i (i2w _) = _` (fn th => ONCE_REWRITE_TAC [GSYM th]) >>
rw [GSYM w2n_i2n])
>- ( (* truncating *)
fs [] >> rw [] >>
`∀i. truncate_2comp i (dimindex (:β)) = w2i (i2w i : 'b word)`
by rw [GSYM truncate_2comp_i2w_w2i] >>
rw [i2w_pos, i2n_def, i2w_def] >>
`?j. 0 j -i = j` by rw [] >>
`i = -j` by intLib.COOPER_TAC >>
simp [] >>
simp [GSYM int_sub] >>
`?k. j = &k` by metis_tac [NUM_POSINT_EXISTS] >>
simp [] >>
`k < 2 ** n`
by (fs [ifits_def] >> Cases_on `n` >> fs [ADD1, EXP_ADD]) >>
simp [INT_SUB, word_2comp_n2w, dimword_def] >>
qabbrev_tac `d = dimindex (:'b)` >>
`∃x. (2:num) ** n = 2 ** x * 2 ** d`
by (
`?x. n = x + d` by (qexists_tac `n - d` >> fs [MIN_DEF]) >>
metis_tac [EXP_ADD]) >>
metis_tac [MOD_COMPLEMENT, bitTheory.ZERO_LT_TWOEXP, MULT_COMM]))
>- (
`min m n = m` by rw [MIN_DEF] >>
drule Zsigned_extract0 >> rw [] >> fs [] >>
`w2i (i2w i : 'b word) = truncate_2comp i m` by metis_tac [truncate_2comp_i2w_w2i] >>
rw [] >>
`0 < dimindex (:'b)` by rw [] >>
metis_tac [fits_ident, truncate_2comp_fits])
QED
5 years ago
export_theory ();