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module T = Types
module PV = PrimitiveValues
module V = Values
module E = Expressions
module C = Contexts
module Subst = Substitute
module A = LlbcAst
module L = Logging
module Inv = Invariants
module S = SynthesizeSymbolic
open InterpreterUtils
open InterpreterLoopsCore
(** Prepare the shared loans in the abstractions by moving them to fresh
abstractions.
We use this to prepare an evaluation context before computing a fixed point.
Because a loop iteration might lead to symbolic value expansions and create
shared loans in shared values inside the *fixed* abstractions, which we want
to leave unchanged, we introduce some reborrows in the following way:
{[
abs'0 { SL {l0, l1} s0 }
l0 -> SB l0
l1 -> SB l1
~~>
abs'0 { SL {l0, l1} s0 }
l0 -> SB l2
l1 -> SB l3
abs'2 { SB l0, SL {l2} s2 }
abs'3 { SB l1, SL {l3} s3 }
]}
This is sound but leads to information loss. This way, the fixed abstraction
[abs'0] is never modified because [s0] is never accessed (and thus never
expanded).
We do this because it makes it easier to compute joins and fixed points.
**REMARK**:
As a side note, we only reborrow the loan ids whose corresponding borrows
appear in values (i.e., not in abstractions).
For instance, if we have:
{[
abs'0 {
SL {l0} s0
SL {l1} s1
}
abs'1 { SB l0 }
x -> SB l1
]}
we only introduce a fresh abstraction for [l1].
*)
val prepare_ashared_loans : V.loop_id option -> Cps.cm_fun
(** Compute a fixed-point for the context at the entry of the loop.
We also return:
- the sets of fixed ids
- the map from region group id to the corresponding abstraction appearing
in the fixed point (this is useful to compute the return type of the loop
backward functions for instance).
Rem.: the list of symbolic values should be computable by simply exploring
the fixed point environment and listing all the symbolic values we find.
In the future, we might want to do something more precise, by listing only
the values which are read or modified (some symbolic values may be ignored).
*)
val compute_loop_entry_fixed_point :
C.config ->
V.loop_id ->
Cps.st_cm_fun ->
C.eval_ctx ->
C.eval_ctx * ids_sets * V.abs SymbolicAst.region_group_id_map
(** For the abstractions in the fixed point, compute the correspondance between
the borrows ids and the loans ids, if we want to introduce equivalent
identity abstractions (i.e., abstractions which do nothing - the input
borrows are exactly the output loans).
**Context:**
============
When we (re-enter) the loop, we want to introduce identity abstractions
(i.e., abstractions which actually only introduce fresh identifiers for
some borrows, to abstract away a bit the borrow graph) which have the same
shape as the abstractions introduced for the fixed point (see the explanations
for [match_ctx_with_target]). This allows us to transform the environment
into a fixed point (again, see the explanations for [match_ctx_with_target]).
In order to introduce those identity abstractions, we need to figure out,
for those abstractions, which loans should be linked to which borrows.
We do this in the following way.
We match the fixed point environment with the environment upon first entry
in the loop, and exploit the fact that the fixed point was derived by also
joining this first entry environment: because of that, the borrows in the
abstractions introduced for the fixed-point actually exist in this first
environment (they are not fresh). For [list_nth_mut] (see the explanations
at the top of the file) we have the following:
{[
// Environment upon first entry in the loop
env0 = {
abs@0 { ML l0 }
ls -> MB l0 (s2 : loops::List<T>)
i -> s1 : u32
}
// Fixed-point environment
env_fp = {
abs@0 { ML l0 }
ls -> MB l1 (s3 : loops::List<T>)
i -> s4 : u32
abs@fp {
MB l0 // this borrow appears in [env0]
ML l1
}
}
]}
We filter those environments to remove the non-fixed dummy variables,
abstractions, etc. in a manner similar to [match_ctx_with_target]. We
get:
{[
filtered_env0 = {
abs@0 { ML l0 }
ls -> MB l0 (s2 : loops::List<T>)
i -> s1 : u32
}
filtered_env_fp = {
abs@0 { ML l0 }
ls -> MB l1 (s3 : loops::List<T>)
i -> s@ : u32
// removed abs@fp
}
]}
We then match [filtered_env_fp] with [filtered_env0], taking care to not
consider loans and borrows in a disjoint manner, and ignoring the fixed
values, abstractions, loans, etc. We get:
{[
borrows_map: { l1 -> l0 } // because we matched [MB l1 ...] with [MB l0 ...] in [ls]
loans_map: {} // we ignore abs@0, which is "fixed"
]}
From there we deduce that, if we want to introduce an identity abstraction with the
shape of [abs@fp], we should link [l1] to [l0]. In other words, the value retrieved
through the loan [l1] is actually the value which has to be given back to [l0].
*)
val compute_fixed_point_id_correspondance :
ids_sets -> C.eval_ctx -> C.eval_ctx -> borrow_loan_corresp
(** Compute the set of "quantified" symbolic value ids in a fixed-point context.
We compute:
- the set of symbolic value ids that are freshly introduced
- the list of input symbolic values
*)
val compute_fp_ctx_symbolic_values :
C.eval_ctx -> C.eval_ctx -> V.symbolic_value_id_set * V.symbolic_value list
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