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// RUN: %dafny /compile:0 /dprint:"%t.dprint" /vcsMaxKeepGoingSplits:10 "%s" > "%t"
// RUN: %diff "%s.expect" "%t"
class BreadthFirstSearch<Vertex(==)>
{
// The following function is left uninterpreted (for the purpose of the
// verification problem, it can be thought of as a parameter to the class)
function method Succ(x: Vertex): set<Vertex>
// This is the definition of what it means to be a path "p" from vertex
// "source" to vertex "dest"
predicate IsPath(source: Vertex, dest: Vertex, p: List<Vertex>)
{
match p
case Nil => source == dest
case Cons(v, tail) => dest in Succ(v) && IsPath(source, v, tail)
}
predicate IsClosed(S: set<Vertex>) // says that S is closed under Succ
{
forall v :: v in S ==> Succ(v) <= S
}
// This is the main method to be verified. Note, instead of using a
// postcondition that talks about that there exists a path (such that ...),
// this method returns, as a ghost out-parameter, that existential
// witness. The method could equally well have been written using an
// existential quantifier and no ghost out-parameter.
method BFS(source: Vertex, dest: Vertex, ghost AllVertices: set<Vertex>)
returns (d: int, ghost path: List<Vertex>)
// source and dest are among AllVertices
requires source in AllVertices && dest in AllVertices;
// AllVertices is closed under Succ
requires IsClosed(AllVertices);
// This method has two basic outcomes, as indicated by the sign of "d".
// More precisely, "d" is non-negative iff "source" can reach "dest".
// The following postcondition says that under the "0 <= d" outcome,
// "path" denotes a path of length "d" from "source" to "dest":
ensures 0 <= d ==> IsPath(source, dest, path) && length(path) == d;
// Moreover, that path is as short as any path from "source" to "dest":
ensures 0 <= d ==> forall p :: IsPath(source, dest, p) ==> length(path) <= length(p);
// Finally, under the outcome "d < 0", there is no path from "source" to "dest":
ensures d < 0 ==> !exists p :: IsPath(source, dest, p);
{
var V, C, N := {source}, {source}, {};
ghost var Processed, paths := {}, map[source := Nil];
assert domain(paths) == {source};
// V - all encountered vertices
// Processed - vertices reachable from "source" is at most "d" steps
// C - unprocessed vertices reachable from "source" in "d" steps
// (but no less)
// N - vertices encountered and reachable from "source" in "d+1" steps
// (but no less)
d := 0;
while C != {}
// V, Processed, C, N are all subsets of AllVertices:
invariant V <= AllVertices && Processed <= AllVertices && C <= AllVertices && N <= AllVertices;
// source is encountered:
invariant source in V;
// V is the disjoint union of Processed, C, and N:
invariant V == Processed + C + N;
invariant Processed !! C !! N; // Processed, C, and N are mutually disjoint
// "paths" records a path for every encountered vertex
invariant ValidMap(source, paths);
invariant V == domain(paths);
// shortest paths for vertices in C have length d, and for vertices in N
// have length d+1
invariant forall x :: x in C ==> length(Find(source, x, paths)) == d;
invariant forall x :: x in N ==> length(Find(source, x, paths)) == d + 1;
// "dest" is not reachable for any smaller value of "d":
invariant dest in R(source, d, AllVertices) ==> dest in C;
invariant d != 0 ==> dest !in R(source, d-1, AllVertices);
// together, Processed and C are all the vertices reachable in at most d steps:
invariant Processed + C == R(source, d, AllVertices);
// N are the successors of Processed that are not reachable within d steps:
invariant N == Successors(Processed, AllVertices) - R(source, d, AllVertices);
// if we have exhausted C, then we have also exhausted N:
invariant C == {} ==> N == {};
// variant:
decreases AllVertices - Processed;
{
// remove a vertex "v" from "C"
var v :| v in C;
C, Processed := C - {v}, Processed + {v};
ghost var pathToV := Find(source, v, paths);
if v == dest {
forall p | IsPath(source, dest, p)
ensures length(pathToV) <= length(p);
{
Lemma_IsPath_R(source, dest, p, AllVertices);
if length(p) < length(pathToV) {
// show that this branch is impossible
RMonotonicity(source, length(p), d-1, AllVertices);
}
}
return d, pathToV;
}
// process newly encountered successors
var newlyEncountered := set w | w in Succ(v) && w !in V;
V, N := V + newlyEncountered, N + newlyEncountered;
paths := UpdatePaths(newlyEncountered, source, paths, v, pathToV);
if C == {} {
C, N, d := N, {}, d+1;
}
}
// show that "dest" in not in any reachability set, no matter
// how many successors one follows
forall n: nat
ensures dest !in R(source, n, AllVertices);
{
if n < d {
RMonotonicity(source, n, d, AllVertices);
} else {
IsReachFixpoint(source, d, n, AllVertices);
}
}
// Now, show what what the above means in terms of IsPath. More
// precisely, show that there is no path "p" from "source" to "dest".
forall p | IsPath(source, dest, p)
// this and the previous two lines will establish the
// absurdity of a "p" satisfying IsPath(source, dest, p)
ensures false;
{
Lemma_IsPath_R(source, dest, p, AllVertices);
// a consequence of Lemma_IsPath_R is:
// dest in R(source, |p|), AllVertices)
// but that contradicts the conclusion of the preceding forall statement
}
d := -1; // indicate "no path"
}
// property of IsPath
lemma Lemma_IsPath_Closure(source: Vertex, dest: Vertex,
p: List<Vertex>, AllVertices: set<Vertex>)
requires IsPath(source, dest, p) && source in AllVertices && IsClosed(AllVertices);
ensures dest in AllVertices && forall v :: v in elements(p) ==> v in AllVertices;
{
match p {
case Nil =>
case Cons(v, tail) =>
Lemma_IsPath_Closure(source, v, tail, AllVertices);
}
}
// Reachability
function R(source: Vertex, n: nat, AllVertices: set<Vertex>): set<Vertex>
{
if n == 0 then {source} else
R(source, n-1, AllVertices) + Successors(R(source, n-1, AllVertices), AllVertices)
}
function Successors(S: set<Vertex>, AllVertices: set<Vertex>): set<Vertex>
{
set w | w in AllVertices && exists x :: x in S && w in Succ(x)
}
lemma RMonotonicity(source: Vertex, m: nat, n: nat, AllVertices: set<Vertex>)
requires m <= n;
ensures R(source, m, AllVertices) <= R(source, n, AllVertices);
decreases n - m;
{
if m < n {
RMonotonicity(source, m + 1, n, AllVertices);
}
}
lemma IsReachFixpoint(source: Vertex, m: nat, n: nat, AllVertices: set<Vertex>)
requires R(source, m, AllVertices) == R(source, m+1, AllVertices);
requires m <= n;
ensures R(source, m, AllVertices) == R(source, n, AllVertices);
decreases n - m;
{
if m < n {
IsReachFixpoint(source, m + 1, n, AllVertices);
}
}
lemma Lemma_IsPath_R(source: Vertex, x: Vertex, p: List<Vertex>, AllVertices: set<Vertex>)
requires IsPath(source, x, p) && source in AllVertices && IsClosed(AllVertices);
ensures x in R(source, length(p), AllVertices);
{
match p {
case Nil =>
case Cons(v, tail) =>
Lemma_IsPath_Closure(source, x, p, AllVertices);
Lemma_IsPath_R(source, v, tail, AllVertices);
}
}
// ValidMap encodes the consistency of maps (think, invariant).
// An explanation of this idiom is explained in the README file.
predicate ValidMap(source: Vertex, m: map<Vertex, List<Vertex>>)
{
forall v :: v in m ==> IsPath(source, v, m[v])
}
function Find(source: Vertex, x: Vertex, m: map<Vertex, List<Vertex>>): List<Vertex>
requires ValidMap(source, m) && x in m;
ensures IsPath(source, x, Find(source, x, m));
{
m[x]
}
ghost method UpdatePaths(vSuccs: set<Vertex>, source: Vertex,
paths: map<Vertex, List<Vertex>>, v: Vertex, pathToV: List<Vertex>)
returns (newPaths: map<Vertex, List<Vertex>>)
requires ValidMap(source, paths);
requires vSuccs !! domain(paths);
requires forall succ :: succ in vSuccs ==> IsPath(source, succ, Cons(v, pathToV));
ensures ValidMap(source, newPaths) && domain(newPaths) == domain(paths) + vSuccs;
ensures forall x :: x in paths ==>
Find(source, x, paths) == Find(source, x, newPaths);
ensures forall x :: x in vSuccs ==> Find(source, x, newPaths) == Cons(v, pathToV);
{
if vSuccs == {} {
newPaths := paths;
} else {
var succ :| succ in vSuccs;
newPaths := paths[succ := Cons(v, pathToV)];
assert domain(newPaths) == domain(paths) + {succ};
newPaths := UpdatePaths(vSuccs - {succ}, source, newPaths, v, pathToV);
}
}
}
function domain<T, U>(m: map<T, U>): set<T>
{
set t | t in m
}
datatype List<T> = Nil | Cons(head: T, tail: List)
function length(list: List): nat
{
match list
case Nil => 0
case Cons(_, tail) => 1 + length(tail)
}
function elements<T>(list: List<T>): set<T>
{
match list
case Nil => {}
case Cons(x, tail) => {x} + elements(tail)
}
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