# Optimization from partial solution: minimize sum of distances between pairs

I have a problem which I like and I love to think about solutions, but I'm stuck unfortunately. I hope you like it too. The problem states:

I have two lists of 2D points(say A and B) and need to pair up points from A with points from B, under the condition that the sum of the distances in all pairs is minimal. A pair contains one point from A and one from B, a point can be used only once, and as many as possible pairs should be created(i.e. `min(length(A), length(B))`).

I've made a simple example, where color denotes which list the point is from, and the black connections are the solution.

Although this is a nice problem and I suspect is NP-hard, it gets nicer. I can build on existing solutions. Suppose I have two lists and the corresponding solution(i.e. the set of pairs), then the problem I need to solve is to reoptimalize that solution when a point is added to or removed from either list.

I've unfortunately not been able to come up with any non-brute force algorithm yielding the optimal solution. I hope you can. Any algorithm is appreciated in any (pseudo) language, preferably C#.

-
How does the data look? List A = {(3, 5), (5, 6), (1, 2)} and B would be all the points? –  James Black May 23 '11 at 0:06
@James, I'm not sure if I follow you. Both list contain points and no point is in both lists. Both lists are equivalent to the problem, so if I were to interchange A and B, the solution wouldn't change. Does that answer your question? –  JBSnorro May 23 '11 at 0:12
I am trying to see how you know how many lines to draw. And how the two groups are actually represented. –  James Black May 23 '11 at 0:28
@James, in my question I literally already answered that: As many as possible pairs should be created(i.e. min(length(A), length(B)). Secondly, the groups are lists of points, each point containing two coordinates. Your example list A is correct. –  JBSnorro May 23 '11 at 0:37

This problem is solvable in polynomial time via the Hungarian algorithm. To get a square matrix, add dummy entries to the shorter list at "distance 0" from everything.

-
Do you know how to solve the second part without running the whole algorithm again? –  IVlad May 23 '11 at 0:33
@IVlad The standard nomenclature would be "dynamic Hungarian algorithm" and sure enough, people have thought about it: ri.cmu.edu/publication_view.html?pub_id=5805 –  u mad May 23 '11 at 0:36
That is for when the cost of an edge changes. This asks for the new solution when you remove or add a node. The paper seems to present `the incremental assignment problem`, which is closer to what the OP asked, but still different: their version adds two new nodes, one to each set. It might be related however. –  IVlad May 23 '11 at 0:39
@IVlad To add a node, pretend as if you just decreased its assignment costs from infinity. To remove a node, do the reverse. I'm disappointed by the false advertising of that paper. –  u mad May 23 '11 at 0:50
(continuing) I'm not an expert on matching algorithms, but for sure what would work is primal simplex for additions and dual simplex for deletions. Making that more efficient in OP's geometric setting probably involves column/row generation and some fancy geometric data structures. I'm sort of hesitant to expand on this because it would be a serious undertaking even for an algorithms expert. –  u mad May 23 '11 at 1:05

Your problem is an instance of the weighted minimum maximal matching problem (as described in this Wikipedia article). There is no polynomial-time algorithm even for the unweighted problem (all distances equal). There are efficient algorithms to approximately solve it in polynomial time (within a factor of 2).

-
Do you mean a minimum cost maximal matching in a bipartite graph? That's what this seems to be, and it has polynomial algorithms. Also, your link is broken, and I'm not sure what you mean so I can't fix it myself. –  IVlad May 23 '11 at 0:10
Fixed the link and, yes, that's what I meant. The only fast algorithms I know of are for the special case that the graph is a quasi-convex tour. Is there a polynomial algorithm for the general case? –  Ted Hopp May 23 '11 at 0:20
@Ted, Thank you for introducing me to the terminology, 'matching' in particular. I hadn't found anything on wiki due to my lack thereof. But I don't think my problem is the minimum maximal matching problem. The solution I need contains the largest amount of edges, while directly from your link it says: minimum maximal matching [...] contains the smallest possible number of edges. It might be minimum cost maximum matching, but dunno. Nevertheless, the problem is hard, but I'd still like to solve it regardlessly.... –  JBSnorro May 23 '11 at 0:25
I don't know what a quasi-convex tour is, but wikipedia says this `Finding such a matching is known as the assignment problem. It can be solved by using a modified shortest path search in the augmenting path algorithm. If the Bellman-Ford algorithm is used, the running time becomes O(V2E), or the edge cost can be shifted with a potential to achieve O(V2logV + VE) running time with the Dijkstra algorithm and Fibonacci heap.`. Isn't this the assignment problem? Minus the update step anyway, I'm not sure how to do that efficiently yet. –  IVlad May 23 '11 at 0:28
@Ted Hopp Since the underlying bipartite graph is complete, there is no difference between maximal and maximum. –  u mad May 23 '11 at 1:00

This is the minimum weight Euclidean bipartite matching problem. There is a O(n^(2+epsilon)) algorithm.

-