# A* algorithm reopen vertices

Consider the following pseudocode for the `A* search algorithm`:

``````A*(G, s, h)
for each vertex u in V
d[u] := f[u] := infinity
color[u] := WHITE
p[u] := u
end for
color[s] := GRAY
d[s] := 0
f[s] := h(s)
INSERT(Q, s)
while (Q != Ø)
u := EXTRACT-MIN(Q)
for each vertex v in Adj[u]
if (w(u,v) + d[u] < d[v])
d[v] := w(u,v) + d[u]
f[v] := d[v] + h(v)
p[v] := u
if (color[v] = WHITE)
color[v] := GRAY
INSERT(Q, v)
else if (color[v] = BLACK)
color[v] := GRAY
INSERT(Q, v)
end if
else
...
end for
color[u] := BLACK
end while
``````

Now - do I understand correctly that if we want to find a path from the source vertex (`s`) to some destination vertex (let's name it `d`) then we can simply add a check right after the `u := EXTRACT-MIN(Q)` statement like this:

``````    u := EXTRACT-MIN(Q)
if (u = d) RETURN PATH
``````

This is obviously correct in case we don't need to reopen vertices (`else if (color[v] = BLACK`), but is it correct in case we have to reopen them (for example, if the heuristic function is not monotonic)?

-

## 1 Answer

This is correct. If you find the destination node, then you'll never have to reopen anything; you can just return the path. By the properties of the A* algorithm (including an admissible heuristic), the first time you pop the destination node off the priority queue, you'll have a shortest path to it.

-
Actually, it's the first time you select the destination node for expansion, not the first time you encounter it. If you short-circuit the algorithm when you first generate the destination node, it's not guaranteed that you've found the shortest path to it. –  Ted Hopp Dec 26 '11 at 19:19
@TedHopp: rephrased. –  larsmans Dec 26 '11 at 19:20