8.13. Implementing Knight’s Tour¶
The search algorithm we will use to solve the knight’s tour problem is called depth first search (DFS). Whereas the breadth first search algorithm discussed in the previous section builds a search tree one level at a time, a depth first search creates a search tree by exploring one branch of the tree as deeply as possible. In this section we will look at two algorithms that implement a depth first search. The first algorithm we will look at directly solves the knight’s tour problem by explicitly forbidding a node to be visited more than once. The second implementation is more general, but allows nodes to be visited more than once as the tree is constructed. The second version is used in subsequent sections to develop additional graph algorithms.
The depth first exploration of the graph is exactly what we need in order to find a path that has exactly 63 edges. We will see that when the depth first search algorithm finds a dead end (a place in the graph where there are no more moves possible) it backs up the tree to the next deepest vertex that allows it to make a legal move.
The knightTour
function takes four parameters: n
, the current
depth in the search tree; path
, a list of vertices visited up to
this point; u
, the vertex in the graph we wish to explore; and
limit
the number of nodes in the path. The knightTour
function
is recursive. When the knightTour
function is called, it first
checks the base case condition. If we have a path that contains 64
vertices, we return from knightTour
with a status of True
,
indicating that we have found a successful tour. If the path is not long
enough we continue to explore one level deeper by choosing a new vertex
to explore and calling knightTour
recursively for that vertex.
DFS also uses colors to keep track of which vertices in the graph have
been visited. Unvisited vertices are colored white, and visited vertices
are colored gray. If all neighbors of a particular vertex have been
explored and we have not yet reached our goal length of 64 vertices, we
have reached a dead end. When we reach a dead end we must backtrack.
Backtracking happens when we return from knightTour
with a status of
False
. In the breadth first search we used a queue to keep track of
which vertex to visit next. Since depth first search is recursive, we
are implicitly using a stack to help us with our backtracking. When we
return from a call to knightTour
with a status of False
, in line 11,
we remain inside the while
loop and look at the next
vertex in nbrList
.
Listing 3
from pythonds.graphs import Graph, Vertex
def knightTour(n,path,u,limit):
u.setColor('gray')
path.append(u)
if n < limit:
nbrList = list(u.getConnections())
i = 0
done = False
while i < len(nbrList) and not done:
if nbrList[i].getColor() == 'white':
done = knightTour(n+1, path, nbrList[i], limit)
i = i + 1
if not done: # prepare to backtrack
path.pop()
u.setColor('white')
else:
done = True
return done
Let’s look at a simple example of knightTour
in action. You
can refer to the figures below to follow the steps of the search. For
this example we will assume that the call to the getConnections
method on line 6 orders the nodes in
alphabetical order. We begin by calling knightTour(0,path,A,6)
knightTour
starts with node A Figure 3. The nodes adjacent to A are B and D.
Since B is before D alphabetically, DFS selects B to expand next as
shown in Figure 4. Exploring B happens when knightTour
is
called recursively. B is adjacent to C and D, so knightTour
elects
to explore C next. However, as you can see in Figure 5 node C is
a dead end with no adjacent white nodes. At this point we change the
color of node C back to white. The call to knightTour
returns a
value of False
. The return from the recursive call effectively
backtracks the search to vertex B (see Figure 6). The next
vertex on the list to explore is vertex D, so knightTour
makes a
recursive call moving to node D (see Figure 7). From vertex D on,
knightTour
can continue to make recursive calls until we
get to node C again (see Figure 8, Figure 9, and Figure 10). However, this time when we get to node C the
test n < limit
fails so we know that we have exhausted all the
nodes in the graph. At this point we can return True
to indicate
that we have made a successful tour of the graph. When we return the
list, path
has the values [A,B,D,E,F,C]
, which is the order
we need to traverse the graph to visit each node exactly once.
Figure 11 shows you what a complete tour around an eight-by-eight board looks like. There are many possible tours; some are symmetric. With some modification you can make circular tours that start and end at the same square.