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(*
* 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.
*)
(** Symbolic Execution *)
[@@@warning "+9"]
(** generic command: [∀xs. {foot ∧ sub} ms := - {post}] *)
type spec =
{xs: Var.Set.t; foot: Sh.t; sub: Var.Subst.t; ms: Var.Set.t; post: Sh.t}
type xseg = {us: Var.Set.t; xs: Var.Set.t; seg: Sh.seg}
let fresh_var nam us xs =
let var, us = Var.fresh nam ~wrt:us in
(Term.var var, us, Var.Set.add xs var)
let fresh_seg ~loc ?bas ?len ?siz ?arr ?(xs = Var.Set.empty) us =
let freshen term nam us xs =
match term with
| Some term -> (term, us, xs)
| None -> fresh_var nam us xs
in
let bas, us, xs = freshen bas "b" us xs in
let len, us, xs = freshen len "m" us xs in
let siz, us, xs = freshen siz "n" us xs in
let arr, us, xs = freshen arr "a" us xs in
{us; xs; seg= {loc; bas; len; siz; arr}}
let null_eq ptr = Sh.pure (Term.eq Term.null ptr)
(* Overwritten variables renaming and remaining modified variables. [ws] are
the written variables; [rs] are the variables read or in the
precondition; [us] are the variables to which ghosts must be chosen
fresh. *)
let assign ~ws ~rs ~us =
let ovs = Var.Set.inter ws rs in
let sub = Var.Subst.freshen ovs ~wrt:us in
let us = Var.Set.union us (Var.Subst.range sub) in
let ms = Var.Set.diff ws (Var.Subst.domain sub) in
(sub, ms, us)
(*
* Instruction small axioms
*)
(* { emp }
* rs := es
* { * r=eΘ }
*)
let move_spec us reg_exps =
let xs = Var.Set.empty in
let foot = Sh.emp in
let ws, rs =
IArray.fold reg_exps ~init:(Var.Set.empty, Var.Set.empty)
~f:(fun (ws, rs) (reg, exp) ->
(Var.Set.add ws reg, Var.Set.union rs (Term.fv exp)) )
in
let sub, ms, _ = assign ~ws ~rs ~us in
let post =
IArray.fold reg_exps ~init:Sh.emp ~f:(fun post (reg, exp) ->
Sh.and_ (Term.eq (Term.var reg) (Term.rename sub exp)) post )
in
{xs; foot; sub; ms; post}
(* { p-[b;m)->⟨l,α⟩ }
* load l r p
* { r=αΘ * (p-[b;m)->l,α)Θ }
*)
let load_spec us reg ptr len =
let {us; xs; seg} = fresh_seg ~loc:ptr ~siz:len us in
let foot = Sh.seg seg in
let sub, ms, _ = assign ~ws:(Var.Set.of_ reg) ~rs:foot.us ~us in
let post =
Sh.and_
(Term.eq (Term.var reg) (Term.rename sub seg.arr))
(Sh.rename sub foot)
in
{xs; foot; sub; ms; post}
(* { p-[b;m)->⟨l,α⟩ }
* store l p e
* { p-[b;m)->l,e }
*)
let store_spec us ptr exp len =
let {us= _; xs; seg} = fresh_seg ~loc:ptr ~siz:len us in
let foot = Sh.seg seg in
let post = Sh.seg {seg with arr= exp} in
{xs; foot; sub= Var.Subst.empty; ms= Var.Set.empty; post}
(* { d-[b;m)->⟨l,α⟩ }
* memset l d b
* { d-[b;m)->l,b^ }
*)
let memset_spec us dst byt len =
let {us= _; xs; seg} = fresh_seg ~loc:dst ~siz:len us in
let foot = Sh.seg seg in
let post = Sh.seg {seg with arr= Term.splat byt} in
{xs; foot; sub= Var.Subst.empty; ms= Var.Set.empty; post}
(* { d=s * l=0 * d-[b;m)->⟨l,α⟩ }
* memcpy l d s
* { d-[b;m)->l,α }
*)
let memcpy_eq_spec us dst src len =
let {us= _; xs; seg} = fresh_seg ~loc:dst ~len us in
let dst_heap = Sh.seg seg in
let foot =
Sh.and_ (Term.eq dst src) (Sh.and_ (Term.eq len Term.zero) dst_heap)
in
let post = dst_heap in
{xs; foot; sub= Var.Subst.empty; ms= Var.Set.empty; post}
(* { d-[b;m)->⟨l,α⟩ * s-[b';m')->⟨l,α'⟩ }
* memcpy l d s
* { d-[b;m)->l,α' * s-[b';m')->l,α' }
*)
let memcpy_dj_spec us dst src len =
let {us; xs; seg= dst_seg} = fresh_seg ~loc:dst ~siz:len us in
let dst_heap = Sh.seg dst_seg in
let {us= _; xs; seg= src_seg} = fresh_seg ~loc:src ~siz:len ~xs us in
let src_heap = Sh.seg src_seg in
let dst_seg' = {dst_seg with arr= src_seg.arr} in
let dst_heap' = Sh.seg dst_seg' in
let foot = Sh.star dst_heap src_heap in
let post = Sh.star dst_heap' src_heap in
{xs; foot; sub= Var.Subst.empty; ms= Var.Set.empty; post}
let memcpy_specs us dst src len =
[memcpy_eq_spec us dst src len; memcpy_dj_spec us dst src len]
(* { d=s * d-[b;m)->⟨l,α⟩ }
* memmov l d s
* { d-[b;m)->l,α }
*)
let memmov_eq_spec us dst src len =
let {us= _; xs; seg= dst_seg} = fresh_seg ~loc:dst ~len us in
let dst_heap = Sh.seg dst_seg in
let foot = Sh.and_ (Term.eq dst src) dst_heap in
let post = dst_heap in
{xs; foot; sub= Var.Subst.empty; ms= Var.Set.empty; post}
(* { d-[b;m)->⟨l,α⟩ * s-[b';m')->⟨l,α'⟩ }
* memmov l d s
* { d-[b;m)->l,α' * s-[b';m')->l,α' }
*)
let memmov_dj_spec = memcpy_dj_spec
(* memmov footprint for dst < src case *)
let memmov_foot us dst src len =
let xs = Var.Set.empty in
let bas, us, xs = fresh_var "b" us xs in
let siz, us, xs = fresh_var "m" us xs in
let arr_dst, us, xs = fresh_var "a" us xs in
let arr_mid, us, xs = fresh_var "a" us xs in
let arr_src, us, xs = fresh_var "a" us xs in
let src_dst = Term.sub src dst in
let mem_dst = (src_dst, arr_dst) in
let siz_mid = Term.sub len src_dst in
let mem_mid = (siz_mid, arr_mid) in
let mem_src = (src_dst, arr_src) in
let mem_dst_mid_src = [|mem_dst; mem_mid; mem_src|] in
let siz_dst_mid_src, us, xs = fresh_var "m" us xs in
let arr_dst_mid_src, us, xs = fresh_var "a" us xs in
let eq_mem_dst_mid_src =
Term.eq_concat (siz_dst_mid_src, arr_dst_mid_src) mem_dst_mid_src
in
let seg =
Sh.seg
{loc= dst; bas; len= siz; siz= siz_dst_mid_src; arr= arr_dst_mid_src}
in
let foot =
Sh.and_ eq_mem_dst_mid_src
(Sh.and_ (Term.lt dst src)
(Sh.and_ (Term.lt src (Term.add dst len)) seg))
in
(us, xs, bas, siz, mem_dst, mem_mid, mem_src, foot)
(* { d<s * s<d+l * d-[b;m)->⟨s-d,α⟩^⟨l-(s-d),β⟩^⟨s-d,γ⟩ }
* memmov l d s
* { d-[b;m)->l-(s-d),β^s-d,γ^s-d,γ }
*)
let memmov_dn_spec us dst src len =
let us, xs, bas, siz, _, mem_mid, mem_src, foot =
memmov_foot us dst src len
in
let mem_mid_src_src = [|mem_mid; mem_src; mem_src|] in
let siz_mid_src_src, us, xs = fresh_var "m" us xs in
let arr_mid_src_src, _, xs = fresh_var "a" us xs in
let eq_mem_mid_src_src =
Term.eq_concat (siz_mid_src_src, arr_mid_src_src) mem_mid_src_src
in
let post =
Sh.and_ eq_mem_mid_src_src
(Sh.seg
{ loc= dst
; bas
; len= siz
; siz= siz_mid_src_src
; arr= arr_mid_src_src })
in
{xs; foot; sub= Var.Subst.empty; ms= Var.Set.empty; post}
(* { s<d * d<s+l * s-[b;m)->⟨d-s,α⟩^⟨l-(d-s),β⟩^⟨d-s,γ⟩ }
* memmov l d s
* { s-[b;m)->d-s,α^d-s,α^l-(d-s),β }
*)
let memmov_up_spec us dst src len =
let us, xs, bas, siz, mem_src, mem_mid, _, foot =
memmov_foot us src dst len
in
let mem_src_src_mid = [|mem_src; mem_src; mem_mid|] in
let siz_src_src_mid, us, xs = fresh_var "m" us xs in
let arr_src_src_mid, _, xs = fresh_var "a" us xs in
let eq_mem_src_src_mid =
Term.eq_concat (siz_src_src_mid, arr_src_src_mid) mem_src_src_mid
in
let post =
Sh.and_ eq_mem_src_src_mid
(Sh.seg
{ loc= src
; bas
; len= siz
; siz= siz_src_src_mid
; arr= arr_src_src_mid })
in
{xs; foot; sub= Var.Subst.empty; ms= Var.Set.empty; post}
let memmov_specs us dst src len =
[ memmov_eq_spec us dst src len
; memmov_dj_spec us dst src len
; memmov_dn_spec us dst src len
; memmov_up_spec us dst src len ]
(* { emp }
* alloc r [n × l]
* { α'. r-[r;(n×l)Θ)->(n×l)Θ,α' }
*)
let alloc_spec us reg num len =
let foot = Sh.emp in
let siz = Term.mul num len in
let sub, ms, us = assign ~ws:(Var.Set.of_ reg) ~rs:(Term.fv siz) ~us in
let loc = Term.var reg in
let siz = Term.rename sub siz in
let {us= _; xs; seg} = fresh_seg ~loc ~bas:loc ~len:siz ~siz us in
let post = Sh.seg seg in
{xs; foot; sub; ms; post}
(*
* Memory management - see e.g. http://jemalloc.net/jemalloc.3.html
*)
(* { p=0 p-[p;m)->⟨m,α⟩ }
* free p
* { emp }
*)
let free_spec us ptr =
let len, us, xs = fresh_var "m" us Var.Set.empty in
let {us= _; xs; seg} = fresh_seg ~loc:ptr ~bas:ptr ~len ~siz:len ~xs us in
let foot = Sh.or_ (null_eq ptr) (Sh.seg seg) in
let post = Sh.emp in
{xs; foot; sub= Var.Subst.empty; ms= Var.Set.empty; post}
(* { p-[p;m)->⟨m,α⟩ }
* dallocx p
* { emp }
*)
let dallocx_spec us ptr =
let len, us, xs = fresh_var "m" us Var.Set.empty in
let {us= _; xs; seg} = fresh_seg ~loc:ptr ~bas:ptr ~len ~siz:len ~xs us in
let foot = Sh.seg seg in
let post = Sh.emp in
{xs; foot; sub= Var.Subst.empty; ms= Var.Set.empty; post}
(* { emp }
* malloc r s
* { r=0 α'. r-[r;sΘ)->sΘ,α' }
*)
let malloc_spec us reg siz =
let foot = Sh.emp in
let sub, ms, us = assign ~ws:(Var.Set.of_ reg) ~rs:(Term.fv siz) ~us in
let loc = Term.var reg in
let siz = Term.rename sub siz in
let {us= _; xs; seg} = fresh_seg ~loc ~bas:loc ~len:siz ~siz us in
let post = Sh.or_ (null_eq (Term.var reg)) (Sh.seg seg) in
{xs; foot; sub; ms; post}
(* { s≠0 }
* mallocx r s
* { r=0 α'. r-[r;sΘ)->sΘ,α' }
*)
let mallocx_spec us reg siz =
let foot = Sh.pure Term.(dq siz zero) in
let sub, ms, us = assign ~ws:(Var.Set.of_ reg) ~rs:(Term.fv siz) ~us in
let loc = Term.var reg in
let siz = Term.rename sub siz in
let {us= _; xs; seg} = fresh_seg ~loc ~bas:loc ~len:siz ~siz us in
let post = Sh.or_ (null_eq (Term.var reg)) (Sh.seg seg) in
{xs; foot; sub; ms; post}
(* { emp }
* calloc r [n × l]
* { r=0 r-[r;(n×l)Θ)->(n×l)Θ,0^ }
*)
let calloc_spec us reg num len =
let foot = Sh.emp in
let siz = Term.mul num len in
let sub, ms, us = assign ~ws:(Var.Set.of_ reg) ~rs:(Term.fv siz) ~us in
let loc = Term.var reg in
let siz = Term.rename sub siz in
let arr = Term.splat Term.zero in
let {us= _; xs; seg} = fresh_seg ~loc ~bas:loc ~len:siz ~siz ~arr us in
let post = Sh.or_ (null_eq (Term.var reg)) (Sh.seg seg) in
{xs; foot; sub; ms; post}
let size_of_ptr = Term.integer (Z.of_int Llair.Typ.(size_of ptr))
(* { p-[_;_)->⟨W,_⟩ }
* posix_memalign r p s
* { r=ENOMEM * (p-[_;_)->W,_)Θ
* α',q. r=0 * (p-[_;_)->W,q * q-[q;s)->s,α')Θ }
* where W = sizeof void*
*)
let posix_memalign_spec us reg ptr siz =
let {us; xs; seg= pseg} = fresh_seg ~loc:ptr ~siz:size_of_ptr us in
let foot = Sh.seg pseg in
let sub, ms, us =
assign ~ws:(Var.Set.of_ reg)
~rs:(Var.Set.union foot.us (Term.fv siz))
~us
in
let q, us, xs = fresh_var "q" us xs in
let pseg' = {pseg with arr= q} in
let {us= _; xs; seg= qseg} =
fresh_seg ~loc:q ~bas:q ~len:siz ~siz ~xs us
in
let eok = Term.zero in
let enomem = Term.integer (Z.of_int 12) in
let post =
Sh.or_
(Sh.and_ (Term.eq (Term.var reg) enomem) (Sh.rename sub foot))
(Sh.and_
(Term.eq (Term.var reg) eok)
(Sh.rename sub (Sh.star (Sh.seg pseg') (Sh.seg qseg))))
in
{xs; foot; sub; ms; post}
(* { p=0 p-[p;m)->⟨m,α⟩ }
* realloc r p s
* { (r=0 * (pΘ=0 pΘ-[pΘ;m)->m,α))
* α',α'' . r-[r;sΘ)->sΘ,α'
* * (msΘ ? sΘ,α'=m,α^sΘ-m,α'' : m,α=sΘ,α'^m-sΘ,α'') }
*)
let realloc_spec us reg ptr siz =
let len, us, xs = fresh_var "m" us Var.Set.empty in
let {us; xs; seg= pseg} =
fresh_seg ~loc:ptr ~bas:ptr ~len ~siz:len ~xs us
in
let foot = Sh.or_ (null_eq ptr) (Sh.seg pseg) in
let sub, ms, us =
assign ~ws:(Var.Set.of_ reg)
~rs:(Var.Set.union foot.us (Term.fv siz))
~us
in
let loc = Term.var reg in
let siz = Term.rename sub siz in
let {us; xs; seg= rseg} = fresh_seg ~loc ~bas:loc ~len:siz ~siz ~xs us in
let a0 = pseg.arr in
let a1 = rseg.arr in
let a2, _, xs = fresh_var "a" us xs in
let post =
Sh.or_
(Sh.and_ Term.(eq loc null) (Sh.rename sub foot))
(Sh.and_
Term.(
conditional ~cnd:(le len siz)
~thn:(eq_concat (siz, a1) [|(len, a0); (sub siz len, a2)|])
~els:(eq_concat (len, a0) [|(siz, a1); (sub len siz, a2)|]))
(Sh.seg rseg))
in
{xs; foot; sub; ms; post}
(* { s≠0 * p-[p;m)->⟨m,α⟩ }
* rallocx r p s
* { (r=0 * pΘ-[pΘ;m)->m,α)
* α',α'' . r-[r;sΘ)->sΘ,α'
* * (msΘ ? sΘ,α'=m,α^sΘ-m,α'' : m,α=sΘ,α'^m-sΘ,α'') }
*)
let rallocx_spec us reg ptr siz =
let len, us, xs = fresh_var "m" us Var.Set.empty in
let {us; xs; seg= pseg} =
fresh_seg ~loc:ptr ~bas:ptr ~len ~siz:len ~xs us
in
let pheap = Sh.seg pseg in
let foot = Sh.and_ Term.(dq siz zero) pheap in
let sub, ms, us = assign ~ws:(Var.Set.of_ reg) ~rs:foot.us ~us in
let loc = Term.var reg in
let siz = Term.rename sub siz in
let {us; xs; seg= rseg} = fresh_seg ~loc ~bas:loc ~len:siz ~siz ~xs us in
let a0 = pseg.arr in
let a1 = rseg.arr in
let a2, _, xs = fresh_var "a" us xs in
let post =
Sh.or_
(Sh.and_ Term.(eq loc null) (Sh.rename sub pheap))
(Sh.and_
Term.(
conditional ~cnd:(le len siz)
~thn:(eq_concat (siz, a1) [|(len, a0); (sub siz len, a2)|])
~els:(eq_concat (len, a0) [|(siz, a1); (sub len siz, a2)|]))
(Sh.seg rseg))
in
{xs; foot; sub; ms; post}
(* { s≠0 * p-[p;m)->⟨m,α⟩ }
* xallocx r p s e
* { α',α'' . sΘr(s+e)Θ * pΘ-[pΘ;r)->r,α'
* * (mr ? r,α'=m,α^r-m,α'' : m,α=r,α'^m-r,α'') }
*)
let xallocx_spec us reg ptr siz ext =
let len, us, xs = fresh_var "m" us Var.Set.empty in
let {us; xs; seg} = fresh_seg ~loc:ptr ~bas:ptr ~len ~siz:len ~xs us in
let foot = Sh.and_ Term.(dq siz zero) (Sh.seg seg) in
let sub, ms, us =
assign ~ws:(Var.Set.of_ reg)
~rs:Var.Set.(union foot.us (union (Term.fv siz) (Term.fv ext)))
~us
in
let reg = Term.var reg in
let ptr = Term.rename sub ptr in
let siz = Term.rename sub siz in
let ext = Term.rename sub ext in
let {us; xs; seg= seg'} =
fresh_seg ~loc:ptr ~bas:ptr ~len:reg ~siz:reg ~xs us
in
let a0 = seg.arr in
let a1 = seg'.arr in
let a2, _, xs = fresh_var "a" us xs in
let post =
Sh.and_
Term.(
and_
(conditional ~cnd:(le len siz)
~thn:(eq_concat (siz, a1) [|(len, a0); (sub siz len, a2)|])
~els:(eq_concat (len, a0) [|(siz, a1); (sub len siz, a2)|]))
(and_ (le siz reg) (le reg (add siz ext))))
(Sh.seg seg')
in
{xs; foot; sub; ms; post}
(* { p-[p;m)->⟨m,α⟩ }
* sallocx r p
* { r=m * (p-[p;m)->m,α)Θ }
*)
let sallocx_spec us reg ptr =
let len, us, xs = fresh_var "m" us Var.Set.empty in
let {us; xs; seg} = fresh_seg ~loc:ptr ~bas:ptr ~len ~siz:len ~xs us in
let foot = Sh.seg seg in
let sub, ms, _ = assign ~ws:(Var.Set.of_ reg) ~rs:foot.us ~us in
let post = Sh.and_ Term.(eq (var reg) len) (Sh.rename sub foot) in
{xs; foot; sub; ms; post}
(* { p-[p;m)->⟨m,α⟩ }
* malloc_usable_size r p
* { mr * (p-[p;m)->m,α)Θ }
*)
let malloc_usable_size_spec us reg ptr =
let len, us, xs = fresh_var "m" us Var.Set.empty in
let {us; xs; seg} = fresh_seg ~loc:ptr ~bas:ptr ~len ~siz:len ~xs us in
let foot = Sh.seg seg in
let sub, ms, _ = assign ~ws:(Var.Set.of_ reg) ~rs:foot.us ~us in
let post = Sh.and_ Term.(le len (var reg)) (Sh.rename sub foot) in
{xs; foot; sub; ms; post}
(* { s≠0 }
* r = nallocx s
* { r=0 r=sΘ }
*)
let nallocx_spec us reg siz =
let xs = Var.Set.empty in
let foot = Sh.pure (Term.dq siz Term.zero) in
let sub, ms, _ = assign ~ws:(Var.Set.of_ reg) ~rs:foot.us ~us in
let loc = Term.var reg in
let siz = Term.rename sub siz in
let post = Sh.or_ (null_eq loc) (Sh.pure (Term.eq loc siz)) in
{xs; foot; sub; ms; post}
let size_of_int_mul =
Term.mul (Term.integer (Z.of_int Llair.Typ.(size_of siz)))
(* { r-[_;_)->⟨m,_⟩ * i-[_;_)->⟨_,m⟩ * w=0 * n=0 }
* mallctl r i w n
* { α'. r-[_;_)->m,α' * i-[_;_)->_,m }
*)
let mallctl_read_spec us r i w n =
let {us; xs; seg= iseg} = fresh_seg ~loc:i us in
let {us; xs; seg= rseg} = fresh_seg ~loc:r ~siz:iseg.arr ~xs us in
let a, _, xs = fresh_var "a" us xs in
let foot =
Sh.and_
Term.(eq w null)
(Sh.and_ Term.(eq n zero) (Sh.star (Sh.seg iseg) (Sh.seg rseg)))
in
let rseg' = {rseg with arr= a} in
let post = Sh.star (Sh.seg rseg') (Sh.seg iseg) in
{xs; foot; sub= Var.Subst.empty; ms= Var.Set.empty; post}
(* { p-[_;_)->⟨W×l,_⟩ * r-[_;_)->⟨m,_⟩ * i-[_;_)->⟨_,m⟩ * w=0 * n=0 }
* mallctlbymib p l r i w n
* { α'. p-[_;_)->W×l,_ * r-[_;_)->m,α' * i-[_;_)->_,m }
* where W = sizeof int
*)
let mallctlbymib_read_spec us p l r i w n =
let wl = size_of_int_mul l in
let {us; xs; seg= pseg} = fresh_seg ~loc:p ~siz:wl us in
let {us; xs; seg= iseg} = fresh_seg ~loc:i ~xs us in
let m = iseg.arr in
let {us; xs; seg= rseg} = fresh_seg ~loc:r ~siz:m ~xs us in
let const = Sh.star (Sh.seg pseg) (Sh.seg iseg) in
let a, _, xs = fresh_var "a" us xs in
let foot =
Sh.and_
Term.(eq w null)
(Sh.and_ Term.(eq n zero) (Sh.star const (Sh.seg rseg)))
in
let rseg' = {rseg with arr= a} in
let post = Sh.star (Sh.seg rseg') const in
{xs; foot; sub= Var.Subst.empty; ms= Var.Set.empty; post}
(* { r=0 * i=0 * w-[_;_)->⟨n,_⟩ }
* mallctl r i w n
* { w-[_;_)->n,_ }
*)
let mallctl_write_spec us r i w n =
let {us= _; xs; seg} = fresh_seg ~loc:w ~siz:n us in
let post = Sh.seg seg in
let foot = Sh.and_ Term.(eq r null) (Sh.and_ Term.(eq i zero) post) in
{xs; foot; sub= Var.Subst.empty; ms= Var.Set.empty; post}
(* { p-[_;_)->⟨W×l,_⟩ * r=0 * i=0 * w-[_;_)->⟨n,_⟩ }
* mallctl r i w n
* { p-[_;_)->W×l,_ * w-[_;_)->n,_ }
* where W = sizeof int
*)
let mallctlbymib_write_spec us p l r i w n =
let wl = size_of_int_mul l in
let {us; xs; seg= pseg} = fresh_seg ~loc:p ~siz:wl us in
let {us= _; xs; seg= wseg} = fresh_seg ~loc:w ~siz:n ~xs us in
let post = Sh.star (Sh.seg pseg) (Sh.seg wseg) in
let foot = Sh.and_ Term.(eq r null) (Sh.and_ Term.(eq i zero) post) in
{xs; foot; sub= Var.Subst.empty; ms= Var.Set.empty; post}
let mallctl_specs us r i w n =
[mallctl_read_spec us r i w n; mallctl_write_spec us r i w n]
let mallctlbymib_specs us p j r i w n =
[ mallctlbymib_read_spec us p j r i w n
; mallctlbymib_write_spec us p j r i w n ]
(* { p-[_;_)->⟨W×n,α⟩ * o-[_;_)->⟨_,n⟩ }
* mallctlnametomib p o
* { α'.
* p-[_;_)->W×n,α' * o-[_;_)->_,n }
* where W = sizeof int
*
* Note: post is too strong, more accurate would be:
* { α',α²,α³,n'. W×n,α=W×n',α³^W×(n-n'),α² *
* p-[_;_)->W×n',α' * p+W×n'-[_;_)->W×(n-n'),α² * o-[_;_)->_,n' }
*)
let mallctlnametomib_spec us p o =
let {us; xs; seg= oseg} = fresh_seg ~loc:o us in
let n = oseg.arr in
let wn = size_of_int_mul n in
let {us; xs; seg= pseg} = fresh_seg ~loc:p ~siz:wn ~xs us in
let a, _, xs = fresh_var "a" us xs in
let foot = Sh.star (Sh.seg oseg) (Sh.seg pseg) in
let pseg' = {pseg with arr= a} in
let post = Sh.star (Sh.seg pseg') (Sh.seg oseg) in
{xs; foot; sub= Var.Subst.empty; ms= Var.Set.empty; post}
(*
* cstring - see e.g. http://www.cplusplus.com/reference/cstring/
*)
(* { p-[b;m)->⟨l,α⟩ }
* r = strlen p
* { r=(b+m-p-1)Θ * (p-[b;m)->l,α)Θ }
*)
let strlen_spec us reg ptr =
let {us; xs; seg} = fresh_seg ~loc:ptr us in
let foot = Sh.seg seg in
let sub, ms, _ = assign ~ws:(Var.Set.of_ reg) ~rs:foot.us ~us in
let {Sh.loc= p; bas= b; len= m; _} = seg in
let ret = Term.sub (Term.sub (Term.add b m) p) Term.one in
let post =
Sh.and_
(Term.eq (Term.var reg) (Term.rename sub ret))
(Sh.rename sub foot)
in
{xs; foot; sub; ms; post}
(*
* Symbolic Execution
*)
let check_preserve_us (q0 : Sh.t) (q1 : Sh.t) =
let gain_us = Var.Set.diff q1.us q0.us in
let lose_us = Var.Set.diff q0.us q1.us in
(Var.Set.is_empty gain_us || fail "gain us: %a" Var.Set.pp gain_us ())
&& (Var.Set.is_empty lose_us || fail "lose us: %a" Var.Set.pp lose_us ())
(* execute a command with given spec from pre *)
let exec_spec pre0 {xs; foot; sub; ms; post} =
([%Trace.call fun {pf} ->
pf "@[%a@]@ @[<2>%a@,@[<hv>{%a %a}@;<1 -1>%a--@ {%a }@]@]" Sh.pp pre0
(Sh.pp_us ~pre:"@<2>∀ " ())
xs Sh.pp foot
(fun fs sub ->
if not (Var.Subst.is_empty sub) then
Format.fprintf fs "∧ %a" Var.Subst.pp sub )
sub
(fun fs ms ->
if not (Var.Set.is_empty ms) then
Format.fprintf fs "%a := " Var.Set.pp ms )
ms Sh.pp post ;
assert (
let vs = Var.Set.diff (Var.Set.diff foot.us xs) pre0.us in
Var.Set.is_empty vs || fail "unbound foot: {%a}" Var.Set.pp vs () ) ;
assert (
let vs = Var.Set.diff (Var.Set.diff post.us xs) pre0.us in
Var.Set.is_empty vs || fail "unbound post: {%a}" Var.Set.pp vs () )]
;
let foot = Sh.extend_us xs foot in
let zs, pre = Sh.bind_exists pre0 ~wrt:xs in
let+ frame = Solver.infer_frame pre xs foot in
Sh.exists (Var.Set.union zs xs)
(Sh.star post (Sh.exists ms (Sh.rename sub frame))))
|>
[%Trace.retn fun {pf} r ->
pf "%a" (Option.pp "%a" Sh.pp) r ;
assert (Option.for_all ~f:(check_preserve_us pre0) r)]
(* execute a multiple-spec command, where the disjunction of the specs
preconditions are known to be tautologous *)
let rec exec_specs pre = function
| ({xs; foot; _} as spec) :: specs ->
let foot = Sh.extend_us xs foot in
let pre_pure = Sh.star (Sh.exists xs (Sh.pure_approx foot)) pre in
let* post = exec_spec pre_pure spec in
let+ posts = exec_specs pre specs in
Sh.or_ post posts
| [] -> Some (Sh.false_ pre.us)
let exec_specs pre specs =
[%Trace.call fun _ -> ()]
;
exec_specs pre specs
|>
[%Trace.retn fun _ r ->
assert (Option.for_all ~f:(check_preserve_us pre) r)]
(*
* Exposed interface
*)
let assume pre cnd =
let post = Sh.and_ cnd pre in
if Sh.is_false post then None else Some post
let kill pre reg =
let ms = Var.Set.of_ reg in
Sh.extend_us ms (Sh.exists ms pre)
let move pre reg_exps =
exec_spec pre (move_spec pre.us reg_exps)
|> function Some post -> post | _ -> fail "Exec.move failed" ()
let load pre ~reg ~ptr ~len = exec_spec pre (load_spec pre.us reg ptr len)
let store pre ~ptr ~exp ~len = exec_spec pre (store_spec pre.us ptr exp len)
let memset pre ~dst ~byt ~len =
exec_spec pre (memset_spec pre.us dst byt len)
let memcpy pre ~dst ~src ~len =
exec_specs pre (memcpy_specs pre.us dst src len)
let memmov pre ~dst ~src ~len =
exec_specs pre (memmov_specs pre.us dst src len)
let alloc pre ~reg ~num ~len = exec_spec pre (alloc_spec pre.us reg num len)
let free pre ~ptr = exec_spec pre (free_spec pre.us ptr)
let nondet pre = function Some reg -> kill pre reg | None -> pre
let abort _ = None
let intrinsic ~skip_throw :
Sh.t -> Var.t option -> Var.t -> Term.t list -> Sh.t option option =
fun pre areturn intrinsic actuals ->
let us = pre.us in
let name =
let n = Var.name intrinsic in
match String.index n '.' with None -> n | Some i -> String.prefix n i
in
let skip pre = Some (Some pre) in
( match (areturn, name, actuals) with
(*
* cstdlib - memory management
*)
(* void* malloc(size_t size) *)
| Some reg, "malloc", [size]
(* void* aligned_alloc(size_t alignment, size_t size) *)
|Some reg, "aligned_alloc", [size; _] ->
Some (exec_spec pre (malloc_spec us reg size))
(* void* calloc(size_t number, size_t size) *)
| Some reg, "calloc", [size; number] ->
Some (exec_spec pre (calloc_spec us reg number size))
(* int posix_memalign(void** ptr, size_t alignment, size_t size) *)
| Some reg, "posix_memalign", [size; _; ptr] ->
Some (exec_spec pre (posix_memalign_spec us reg ptr size))
(* void* realloc(void* ptr, size_t size) *)
| Some reg, "realloc", [size; ptr] ->
Some (exec_spec pre (realloc_spec us reg ptr size))
(*
* jemalloc - non-standard API
*)
(* void* mallocx(size_t size, int flags) *)
| Some reg, "mallocx", [_; size] ->
Some (exec_spec pre (mallocx_spec us reg size))
(* void* rallocx(void* ptr, size_t size, int flags) *)
| Some reg, "rallocx", [_; size; ptr] ->
Some (exec_spec pre (rallocx_spec us reg ptr size))
(* size_t xallocx(void* ptr, size_t size, size_t extra, int flags) *)
| Some reg, "xallocx", [_; extra; size; ptr] ->
Some (exec_spec pre (xallocx_spec us reg ptr size extra))
(* size_t sallocx(void* ptr, int flags) *)
| Some reg, "sallocx", [_; ptr] ->
Some (exec_spec pre (sallocx_spec us reg ptr))
(* void dallocx(void* ptr, int flags) *)
| None, "dallocx", [_; ptr]
(* void sdallocx(void* ptr, size_t size, int flags) *)
|None, "sdallocx", [_; _; ptr] ->
Some (exec_spec pre (dallocx_spec us ptr))
(* size_t nallocx(size_t size, int flags) *)
| Some reg, "nallocx", [_; size] ->
Some (exec_spec pre (nallocx_spec us reg size))
(* size_t malloc_usable_size(void* ptr) *)
| Some reg, "malloc_usable_size", [ptr] ->
Some (exec_spec pre (malloc_usable_size_spec us reg ptr))
(* int mallctl(const char* name, void* oldp, size_t* oldlenp, void* newp,
size_t newlen) *)
| Some _, "mallctl", [newlen; newp; oldlenp; oldp; _] ->
Some (exec_specs pre (mallctl_specs us oldp oldlenp newp newlen))
(* int mallctlnametomib(const char* name, size_t* mibp, size_t* miblenp) *)
| Some _, "mallctlnametomib", [miblenp; mibp; _] ->
Some (exec_spec pre (mallctlnametomib_spec us mibp miblenp))
(* int mallctlbymib(const size_t* mib, size_t miblen, void* oldp, size_t*
oldlenp, void* newp, size_t newlen); *)
| Some _, "mallctlbymib", [newlen; newp; oldlenp; oldp; miblen; mib] ->
Some
(exec_specs pre
(mallctlbymib_specs us mib miblen oldp oldlenp newp newlen))
| _, "malloc_stats_print", _ -> skip pre
(*
* cstring
*)
(* size_t strlen (const char* ptr) *)
| Some reg, "strlen", [ptr] ->
Some (exec_spec pre (strlen_spec us reg ptr))
(*
* cxxabi
*)
| Some _, "__cxa_allocate_exception", [_] when skip_throw ->
skip (Sh.false_ pre.us)
(*
* folly
*)
(* bool folly::usingJEMalloc() *)
| Some _, "_ZN5folly13usingJEMallocEv", [] -> skip pre
| _ -> None )
$> function
| None -> ()
| Some _ ->
[%Trace.info
"@[<2>exec intrinsic@ @[%a%a(@[%a@])@] from@ @[{ %a@ }@]@]"
(Option.pp "%a := " Var.pp)
areturn Var.pp intrinsic (List.pp ",@ " Term.pp)
(List.rev actuals) Sh.pp pre]