# java function that finds graph with minimal edge crossings

I am looking for a java function that minimizes the number of edge crossings in a graph.

The input is supposed to be a Graph G(E[],V[]) where V[] is an array of all nodes and E[] is an array of all the edges. The output should be a 2D array of edge elements (E[][]) which contains all pairs of edges crossing each other.

Please see https://www.ads.tuwien.ac.at/research/graphDrawing.html section "Crossing minimization" as an example. Fig 3a and 3b show different representations of the same graph. But fig 3b has the minimal amount of edge crossings. So in this particular case the functions outputarray should have length [1][2] with the elements [0][0]="Node Green Yellow" and [0][1]="Node Pink Orange"

I already looked at JUNG but I couldn't find an inbuilt function for minimization. Most of the libraries that do minimization are commercial and completely overloaded. I am not looking for a graphical output. I only need the minimal possible amount of edge crossings and the involved edges.

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Please post a more visual example of what you want – Argote Apr 10 '12 at 15:24
If it's a weighted, connected graph then a minimum spanning tree will give you a tree with all vertices still connected and with no crossing edges. This is true for all planar graphs. If you want to represent non-planar graphs this is a little more complex and requires you to find regions where you can embed edges (if they can be moved) or feasible regions of what edges to use based on badness cost of how many regions they span. – Jesus Ramos Apr 11 '12 at 7:24
I have to keep all the nodes and usually have no planar graphs. I am implementing a fermionic tensor network and have to add extra tensors at line crossings. Therefore I want to add as few tensors as possible... This is not part of the question but a motivation why I need it. – user1324005 Apr 11 '12 at 8:09