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Given a connected undirected graph with n vertices, n-1 edges. Find a path from 1 vertex, go through exactly n-k+1 other vertices and return to the starting vertex with the shortest path length. And each edge has the positive weight and k <= min(20, n-1), n <= 1e5

I think that I can use Dijikstra's Algorithm and some properties of Hamilton cycle. Then I realize Eulerian cycle is visiting each vertices once.

How can I deal with this problem?

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  • Are your graph links directed or undirected? Jun 7, 2021 at 13:22
  • @ravenspoint It is undirected one Jun 7, 2021 at 14:41
  • What about visiting the same node twice? Jun 7, 2021 at 15:27
  • @ravenspoint You can visit the same note as many time as you like, but the path length must be shortest and you must visit n-k+1 nodes Jun 7, 2021 at 15:29
  • OK, then my answer will give you what you want. Jun 7, 2021 at 15:29

1 Answer 1

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For an undirected graph and permission to transit the same link twice this algorithm will provide the result.

  • Run Dijsktra. This will give you the paths from the starting node to every other node.
  • Find all paths with ( n - k + 1 ) / 2 nodes visited.
  • Select from those paths the shortest.
  • Add to path the path nodes in reverse order, getting back to starting node.

Note: you will have to decide what to do if n - k + 1 is odd.

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