So my latest thoughts are to do a topological sort over the entire graph whenever an edge is added or removed and store the order of immediate child nodes to be traversed for each node (which may be a bit of a tricky algorithm to write).

Then I do a modified breadth first search (as suggested by chaos), and in the following bfs pseudo-code, modify the line:

```
for each vertex v in Adj[u]
```

to be:

```
for each vertex v in OrderedAdj[u]
```

pseudocode:

```
BFS(G, s)
for each vertex u in V[G]
color[u] := WHITE
d[u] := infinity
p[u] := u
end for
color[s] := GRAY
d[s] := 0
ENQUEUE(Q, s)
while (Q != Ø)
u := DEQUEUE(Q)
for each vertex v in Adj[u]
if (color[v] = WHITE)
color[v] := GRAY
d[v] := d[u] + 1
p[v] := u
ENQUEUE(Q, v)
else
if (color[v] = GRAY)
...
else
...
end for
color[u] := BLACK
end while
return (d, p)
```

I believe this is the most optimal way of achieving this, but does involve me writing my own bfs traversal algorithm, plus storing the order of nodes on each node (an overhead in memory I was hoping to avoid), and writing my own dfs visitor for finding the order and storing this on the nodes in the caching stage.

I am surprised that there isn't an existing way of doing this though, as it seems to me a fairly common way of navigating a dag graph...