The problem I am trying to solve is as follows: Given two lists of equal length containing points, find a mapping that minimizes the sum of distances between pairs. The reason I'm trying to do this is to find the closest points in two polygons for a genetic algorithm I'm building, that would ideally line up two genes based on the output of this computation to maximize the spatial similarity.

This is known as the linear assignment problem. The Hungarian algorithm is one way to solve it. 


I actually asked basically the same question a few days ago here. There are a bunch of good links to explanations of possible solutions including simulated annealing. 

