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course-schedule.py
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course-schedule.py
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from __future__ import print_function
# Time: O(|V| + |E|)
# Space: O(|E|)
#
# There are a total of n courses you have to take, labeled from 0 to n - 1.
#
# Some courses may have prerequisites, for example to take course 0
# you have to first take course 1, which is expressed as a pair: [0,1]
#
# Given the total number of courses and a list of prerequisite pairs,
# is it possible for you to finish all courses?
#
# For example:
#
# 2, [[1,0]]
# There are a total of 2 courses to take. To take course 1
# you should have finished course 0. So it is possible.
#
# 2, [[1,0],[0,1]]
# There are a total of 2 courses to take. To take course 1 you should have
# finished course 0, and to take course 0 you should also have finished course 1. So it is impossible.
#
# click to show more hints.
#
# Hints:
# This problem is equivalent to finding if a cycle exists in a directed graph.
# If a cycle exists, no topological ordering exists and therefore it will be impossible to take all courses.
# There are several ways to represent a graph. For example, the input prerequisites is a graph represented by
# a list of edges. Is this graph representation appropriate?
# Topological Sort via DFS - A great video tutorial (21 minutes) on Coursera explaining the basic concepts
# of Topological Sort.
# Topological sort could also be done via BFS.
#
import collections
class Solution(object):
def canFinish(self, numCourses, prerequisites):
"""
:type numCourses: int
:type prerequisites: List[List[int]]
:rtype: bool
"""
zero_in_degree_queue, in_degree, out_degree = collections.deque(), {}, {}
for i, j in prerequisites:
if i not in in_degree:
in_degree[i] = set()
if j not in out_degree:
out_degree[j] = set()
in_degree[i].add(j)
out_degree[j].add(i)
for i in xrange(numCourses):
if i not in in_degree:
zero_in_degree_queue.append(i)
while zero_in_degree_queue:
prerequisite = zero_in_degree_queue.popleft()
if prerequisite in out_degree:
for course in out_degree[prerequisite]:
in_degree[course].discard(prerequisite)
if not in_degree[course]:
zero_in_degree_queue.append(course)
del out_degree[prerequisite]
if out_degree:
return False
return True
if __name__ == "__main__":
print(Solution().canFinish(1, []))