I have a series of graph coordinates and I need to find the shortest one-way path through them all. I have no predetermined start/end but each point must only be touched once and returning to the optimal origin is NOT required.

I've tried a couple TSP approaches, but they all seem to be based on returning to the origin at the end which gives terribly inefficient results in this case.

Example

1, 13

3, 0

3, 7

2, 21

2, 11

3, 12

1, 19

3, 6

would resolve to

3, 0

3, 6

3, 7

3, 12

2, 11

1, 13

1, 19

2, 21

Notes:

Yes I tried the search function, there is a basically identical question Algorithm: shortest path between all points however the only real answer is a TSP, which once again, closed circuit is inefficient for this.

It does not need to be 100% accurate, I already have a permutations method but its far too slow, I need to handle at least ~25-30 points, settling with a good approximation works for me

Thanks in advance.

Edit to clarify, TSP tends to solve as in img #1, my desired result is img #2

img 3 is the above sample solved via a TSP and img #4 is the desired (x coords shifted back -.5 for visibility)

Couple more for good measure #1 = TSP, #2 = desired

Basically i want the shortest chain connecting n points, using whichever start and end point is most efficient

changing directions. How about making larger the costs of links with (x2,y2) < (x1,y1)? It would bias standard TSP algorithms towards solutions that start near the upper left, and finish near the bottom-right. – Apalala Jan 25 '11 at 15:45