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How fast is simplex method compared with brute-force or any other algorithm to solve a ts problem?

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For more answers, please try: – Samik R Dec 26 '12 at 23:42
up vote 2 down vote accepted

You can't model a TS problem with a "pure" LP problem (with continuous variables). You can use an integer-programming formulation, wich will use the simplex method at each node of a research tree (branch and bound or branch and cut method). It will work for small problems, but it is slow because the problem is hard: with one binary variable for each edge for instance, you need a lot of constraints to model the fact that the path is a cycle.

Brute-force is intractable (the problem is exponential), do not even try it unless you have a very small problem. Use the MIP formulation, even for small problems.

For big problems, you should use some kind of heuristic (I think simulated annealing give good results on this one), or a "smart" modelization of you problem (column generation for instance) if you want an exact solution.

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I didn't understand much but why is simplex method slow? I.e. can I use branch-and-bound with mip formulation? – Betterdev Dec 6 '12 at 13:17
Yes, of course you can use a branch-and-bound method. It will be slow for large input because TS is a hard problem, and your MIP formulation will have a lot of constraints (or a lot of variables): there is no "simple and fast" method. – Nicolas Grebille Dec 6 '12 at 13:37
However, I was pointing out that simplex and branch-and-bound are different algorithms: the simplex is used for continuous linear problems, and is (often) used in the relaxations at each node of the branch-and-bound research tree. You can't use directly the simplex method to solve a MIP. – Nicolas Grebille Dec 6 '12 at 13:39
If you have glpk, there is an implementation in the examples (I think it is called "tspsol", but I can't check right now). – Nicolas Grebille Dec 6 '12 at 13:45
Sorry to be pedantic, but I believe that a result of Yannakakis says that you cannot model a TSP as a linear program with a polynomial number of constraints. So technically you could model TSP with only continuous variables, but the formulation will be prohibitively large. A consequence of this result is that you could not prove P=NP by finding a linear programming formulation of a TSP (which many have claimed to do). – raoulcousins Mar 17 '13 at 20:55

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