I am referring to Skienna's Book on Algorithms.

The problem of testing whether a graph `G`

contains a `Hamiltonian path`

is `NP-hard`

, where a Hamiltonian path `P`

is a path that visits each vertex exactly once. There does not have to be an edge in G from the ending vertex to the starting vertex of P , unlike in the Hamiltonian cycle problem.

Given a directed acyclic graph G (`DAG`

), give an `O(n + m)`

time algorithm to test whether or not it contains a Hamiltonian path.

My approach,

I am planning to use `DFS`

and `Topological sorting`

. But I didn't know how to connect the two concepts in solving the problem. How can a topological sort be used to determine the solution.

Any suggestions?