# Algorithm to find a linear path of minimum weight in a graph that connects all the vertices exactly once

Given a weighted undirected graph with n vertices, I face the problem of finding a path of minimum weight that connects each of the vertices in a line. At first, I thought this is the problem of finding the minimum spanning tree but this is not the case. In case of a spanning tree, there may be branches at a vertex or the degree may be greater than two. What I need to find is a linear path i.e all the vertices except the end vertices have degree exactly two. The start and end vertex can be any of the n vertices.

Mine was a greedy approach i.e

``````first chose any vertex, maintain a sum
check all its neighbors such that the cost of reaching it is
least among all the neighbors
mark this neighbor as visited
repeat the procedure above until all the points have been visited.
``````

I will have to do this for all the vertices as the starting point. I am not sure if this algorithm is correct and also its complexity is high. What should be the better approach to this problem?

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This problem is known to be NP-hard by a reduction from the Hamiltonian path problem, since if you give all the edges weight 1 and ask "is there a linear path of weight at most n?" then the answer is "yes" precisely if the graph contains a Hamiltonian path. As a result, you are unlikely to find an algorithm that works better than pure brute force, since unless P = NP there are no polynomial-time solutions.