Last Updated : 23 Jul, 2025
Topological sorting for Directed Acyclic Graph (DAG) is a linear ordering of vertices such that for every directed edge uv, vertex u comes before v in the ordering. Topological Sorting for a graph is not possible if the graph is not a DAG.
Example:
Input: Graph :
ExampleOutput: 5 4 2 3 1 0
Explanation: The first vertex in topological sorting is always a vertex with an in-degree of 0 (a vertex with no incoming edges). A topological sorting of the following graph is “5 4 2 3 1 0”. There can be more than one topological sorting for a graph. Another topological sorting of the following graph is “4 5 2 3 1 0”.
Topological sorting can be implemented recursively and non-recursively. First, we show the clearer recursive version, then provide the non-recursive version with analysis.
Recursive DFS-Based Topological SortingThis approach uses Depth-First Search (DFS) and recursion to find the topological order of a Directed Acyclic Graph (DAG). It explores all dependencies first and then adds the node to a stack, ensuring the correct order. The final sequence is obtained by reversing the stack.
Python
from collections import defaultdict
#Class to represent a graph
class Graph:
def __init__(self,vertices):
self.graph = defaultdict(list) #dictionary containing adjacency List
self.V = vertices #No. of vertices
# function to add an edge to graph
def addEdge(self,u,v):
self.graph[u].append(v)
# A recursive function used by topologicalSort
def topologicalSortUtil(self,v,visited,stack):
# Mark the current node as visited.
visited[v] = True
# Recur for all the vertices adjacent to this vertex
for i in self.graph[v]:
if visited[i] == False:
self.topologicalSortUtil(i,visited,stack)
# Push current vertex to stack which stores result
stack.insert(0,v)
# The function to do Topological Sort. It uses recursive
# topologicalSortUtil()
def topologicalSort(self):
# Mark all the vertices as not visited
visited = [False]*self.V
stack =[]
# Call the recursive helper function to store Topological
# Sort starting from all vertices one by one
for i in range(self.V):
if visited[i] == False:
self.topologicalSortUtil(i,visited,stack)
# Print contents of stack
print (stack)
g= Graph(6)
g.addEdge(5, 2);
g.addEdge(5, 0);
g.addEdge(4, 0);
g.addEdge(4, 1);
g.addEdge(2, 3);
g.addEdge(3, 1);
print ("Following is a Topological Sort of the given graph")
g.topologicalSort()
Following is a Topological Sort of the given graph [5, 4, 2, 3, 1, 0]Iterative DFS-Based Topological Sorting
This method eliminates recursion and uses an explicit stack to simulate DFS traversal. It employs generators for efficient neighbor iteration and manually manages backtracking. This approach is useful for handling large graphs without hitting recursion limits.
Algorithm:PythonThe way topological sorting is solved is by processing a node after all of its children are processed. Each time a node is processed, it is pushed onto a stack in order to save the final result. This non-recursive solution builds on the same concept of DFS with a little tweak which can be understood above and in this article.
However, unlike the recursive solution, which saves the order of the nodes in the stack after all the neighboring elements have been pushed to the program stack, this solution replaces the program stack with a working stack. If a node has a neighbor that has not been visited, the current node and the neighbor are pushed to the working stack to be processed until there are no more neighbors available to be visited.
After all the nodes have been visited, what remains is the final result which is found by printing the stack result in reverse.
from collections import defaultdict
#Class to represent a graph
class Graph:
def __init__(self,vertices):
self.graph = defaultdict(list) #dictionary containing adjacency List
self.V = vertices #No. of vertices
# function to add an edge to graph
def addEdge(self,u,v):
self.graph[u].append(v)
# neighbors generator given key
def neighbor_gen(self,v):
for k in self.graph[v]:
yield k
# non recursive topological sort
def nonRecursiveTopologicalSortUtil(self, v, visited,stack):
# working stack contains key and the corresponding current generator
working_stack = [(v,self.neighbor_gen(v))]
while working_stack:
# get last element from stack
v, gen = working_stack.pop()
visited[v] = True
# run through neighbor generator until it's empty
for next_neighbor in gen:
if not visited[next_neighbor]: # not seen before?
# remember current work
working_stack.append((v,gen))
# restart with new neighbor
working_stack.append((next_neighbor, self.neighbor_gen(next_neighbor)))
break
else:
# no already-visited neighbor (or no more of them)
stack.append(v)
# The function to do Topological Sort.
def nonRecursiveTopologicalSort(self):
# Mark all the vertices as not visited
visited = [False]*self.V
# result stack
stack = []
# Call the helper function to store Topological
# Sort starting from all vertices one by one
for i in range(self.V):
if not(visited[i]):
self.nonRecursiveTopologicalSortUtil(i, visited,stack)
# Print contents of the stack in reverse
stack.reverse()
print(stack)
g= Graph(6)
g.addEdge(5, 2);
g.addEdge(5, 0);
g.addEdge(4, 0);
g.addEdge(4, 1);
g.addEdge(2, 3);
g.addEdge(3, 1);
print("The following is a Topological Sort of the given graph")
g.nonRecursiveTopologicalSort()
The following is a Topological Sort of the given graph [5, 4, 2, 3, 1, 0]Complexity Analysis:
Please refer complete article on Topological Sorting for more details.
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