**Given:**

A Set (for the sake of discussion we will call it `S`

), which is an *unordered** collection of line segments*. Each line segment is defined as two Longitude-Latitude end-points. While all of the line segments follow an implied curve, there are "gaps" between each of the segments, of various sizes. We refer to this curve as *"implied"* because it is not explicitly defined anywhere. The only information that we have available are the line segments contained within `S`

.

**Desired Result:**

A sequence (for the sake of discussion we will call it `R`

), which is an *ordered** collection of line segments*. Each line segment is defined just as before, following the same implied curve as before but are now **sorted by their position along the implied curve**.

**Context (i.e. "Why in the heck do I need this?"):**

Basically I have incomplete geographical data that needs to be *normalized* and "completed" by doing some very simple interpolation to form a complete curve with *no* gaps. You might ask "why not just fit a curve to all the line segment end-points and be done with it?" -- well, that's not quite what I am after. The line segments are precisely where they should be located, and there is no need for the final curve to be "smooth". In fact, I intend to connect each of the segments with a straight-line (the crudest form of interpolation imaginable). But, connecting the segments is easy; the hard part is sorting them.

**So In Summary: What would be a performant algorithm for going from S to R?**

`S`

looks like? – angelatlarge Apr 4 '13 at 23:37