# Traveling Salesman - 2-Opt improvement

So I've been looking for an explanation of a 2-opt improvement for the traveling salesman problem, and I get the jist of it, but I don't understand one thing.

I understand that IF two edges of a generated path cross each other, I can just switch two points and they will no longer cross. HOWEVER - I do not understand how I can determine whether or not two edges cross.

To make my question clear, this is what I've done so far: (I did it in java)

1. I have an object called Point that represents a city, with an x and y coordinate.
2. I have a PointSet which has a set of Points contained in a List.
3. I have a method for PointSet called computeByNN() which arranges the PointSet in a fairly short manner through a Nearest Neighbor algorithm.

So now I have a sorted PointSet (not optimal, but still short) and I want to do 2-opt on it. However, I don't know where to start. Should I check each and every line segment to see if they cross, and if they do, switch two points? I feel like that defeats the purpose of heuristics and it becomes a sort of brute force solution. Is there an efficient way to find if two segments of the tour cross?

I applogize if my question is not clear. I'll try to edit it to make it clearer if anyone needs me to.

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Checking each in every edge is only O(n²). A perfectly reasonable running time when approximating an NP-complete problem (which obviously has no known polynomial time exact solution). –  Paulpro Sep 6 '13 at 18:08
Yeah, but I was hoping there was a better way to do it. After performing nearest neighbor, and then repeating it for every point, I didn't want to take up more time to compare while performing 2-opt. However, I suppose you're right and i'll try checking every edge and see what it's like. I'm just worrying of the increase in the time when the number of cities increases to say, 1000. –  Trust Sep 6 '13 at 18:21