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I'm looking for an instance of Euclidean TSP problem (shortest path among a number of points) on a complete graph with a known perfect solution. Has anybody encountered such examples? Or is there a simple algorithm to generate such instance that there will certainly be no shorter route than generated?

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closed as off topic by bmargulies, dzida, Harald Scheirich, Mario Sannum, Ashwini Chaudhary Jan 19 '13 at 22:50

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up vote 2 down vote accepted

I'm pretty sure there are libraries of problems for this. Looking at I see

Q: Are the given solution values only the best ones known?.

A: No, for every problem either the value of a provably optimal solution or an interval given by the best known lower and upper bound is listed. The optimality of solutions has been proven by branch-and-cut or branch-and-bound algorithms.

Also see at

When I published TSPLIB more than 10 years ago, I expected that at least solving the large problem instances to proven optimality would pose a challange for the years to come.

However, due to enormous algorithmic progress all problems are now solved to optimality!!

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Thank you, the site was very helpful. – Maciej Stachowski Jan 19 '13 at 21:58

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