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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I'm pretty sure there are libraries of problems for this. Looking at http://comopt.ifi.uniheidelberg.de/software/TSPLIB95/TSPFAQ.html 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 branchandcut or branchandbound algorithms. Also see at http://comopt.ifi.uniheidelberg.de/software/TSPLIB95/STSP.html 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!! 

