# left to right, pre-order depth first tree search, iterative. O(n) time/space
def depthFirstSearch(root):
st = [root]
while st:
current = st.pop()
print(current)
if current.right: st.append(current.right)
if current.left: st.append(current.left)
# Python program to print DFS traversal for complete graph
from collections import defaultdict
# This class represents a directed graph using adjacency
# list representation
class Graph:
# Constructor
def __init__(self):
# default dictionary to store graph
self.graph = defaultdict(list)
# function to add an edge to graph
def addEdge(self,u,v):
self.graph[u].append(v)
# A function used by DFS
def DFSUtil(self, v, visited):
# Mark the current node as visited and print it
visited[v]= True
print v,
# Recur for all the vertices adjacent to
# this vertex
for i in self.graph[v]:
if visited[i] == False:
self.DFSUtil(i, visited)
# The function to do DFS traversal. It uses
# recursive DFSUtil()
def DFS(self):
V = len(self.graph) #total vertices
# Mark all the vertices as not visited
visited =[False]*(V)
# Call the recursive helper function to print
# DFS traversal starting from all vertices one
# by one
for i in range(V):
if visited[i] == False:
self.DFSUtil(i, visited)
# Driver code
# Create a graph given in the above diagram
g = Graph()
g.addEdge(0, 1)
g.addEdge(0, 2)
g.addEdge(1, 2)
g.addEdge(2, 0)
g.addEdge(2, 3)
g.addEdge(3, 3)
print "Following is Depth First Traversal"
g.DFS()
# This code is contributed by Neelam Yadav
from collections import defaultdict
class Graph:
def __init__(self):
self.graph = defaultdict(list)
def addEdge(self, u, v):
self.graph[u].append(v)
print("This is u" , u)
def DFSUtil(self, v, visited):
visited.add(v)
print(v, end=" ")
for neighbor in self.graph[v]:
if neighbor not in visited:
self.DFSUtil(neighbor, visited)
def DFS(self, v):
visited = set()
self.DFSUtil(v, visited)
if __name__ == "__main__":
g = Graph()
g.addEdge(0, 1)
g.addEdge(0, 2)
g.addEdge(1, 2)
g.addEdge(2, 0)
g.addEdge(2, 3)
g.addEdge(3, 3)
print("It's done")
g.DFS(2)
# left to right, pre-order depth first tree search, recursive. O(n) time/space
def depthFirstSearchRec(root):
if root == None: return
print(root)
depthFirstSearch(root.left)
depthFirstSearch(root.right)