# How can I find the shortest path in a graph, with adding the least number of new nodes?

I need to find the shortest path in a graph with the least number of added nodes. The start and end nodes are not important. If there is no path in a graph just between specified n-nodes, I can add some nodes to complete the shortest tree but I want to add as few new nodes as possible.

What algorithm can I use to solve this problem?

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sounds like homework –  jitter Oct 28 '09 at 12:02
Also, the specification of the problem is neither complete nor clear. –  nozebacle Oct 28 '09 at 12:06
I guess you are confusing minimum spanning tree problem with shortest path problem. If there's no path between two nodes in a graph, you can never create a path just by adding nodes; and you can always create a path with length 1 by adding a single edge. –  LeakyCode Oct 28 '09 at 12:06
So: You are given a graph and a set of n nodes, you can add several nodes with any number of edges connecting them to any other nodes, correct? You are to minimize the number of extra nodes, and then? Are you looking for a path A1 -> A2 -> A3 -> ...-> An of minimal length? Or you just have to make sure such path exists? –  Olexiy Oct 28 '09 at 12:09
By chance, are you talking about Steiner trees? (en.wikipedia.org/wiki/Steiner_tree) –  Juliet Oct 28 '09 at 13:15

if it is the target node, you are done.

Check every connected node, if it is the target node. If true you are done

Check if any of the connected nodes is connected to the target node. If true you are done.

Else add a node that is connected to start and end node. done.

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You missed the edge case where the start node is the target node (path length=0) –  MSalters Oct 28 '09 at 13:21

I recommend you to use genetic algorithm. More information here and here. Quickly explaining it, GA is an algorithm to find exact or approximate solutions to optimization and search problems.

You create initial population of possible solutions. You evaluate them with fitness function in order to find out, which of them are most suitable. After that, you use evolutionary algorithms that use techniques inspired by evolutionary biology such as inheritance, mutation, selection, and crossover.

After several generations, you'll find the most suitable (read shortest) solution to the problem.

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Could you please describe it in more detailed way? Now this sounds just like "See Donald Knuth's book." –  Olexiy Oct 28 '09 at 12:21
Olexiy: The short explanation I gave was not necessary but wrote it anyway to satisfy your will. The two links I initially gave, gives in-depth and thorough explanation of GA with sample-code. –  nhaa123 Oct 28 '09 at 12:41