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Dec
15 |
awarded | Notable Question |
Jul
22 |
awarded | Notable Question |
Oct
2 |
awarded | Notable Question |
Aug
18 |
awarded | Popular Question |
Jul
2 |
awarded | Curious |
Jun
12 |
asked | Watts-Strogatz algorithm for creating small world networks: Why a ring lattice? |
May
31 |
comment |
NP-Complete? Optimal graph embedding for a graph with specific constraints
Edge crossing is allowed, but only crossing, an edge can't otherwise overlap. We are tying to build up the embedding - first we start with a set of nodes and their location on the grid. Then we try and embed the edges. As the image shows, the ordering in which we fill up the space on the graph influences the connectivity of subsequent edges, since the space is gradually filled up with new edges. |
May
31 |
awarded | Commentator |
May
31 |
comment |
NP-Complete? Optimal graph embedding for a graph with specific constraints
Strange, it seems to work for me. Does this link work for you? link |
May
31 |
comment |
NP-Complete? Optimal graph embedding for a graph with specific constraints
Not sure where the image went when you were here, but it seems to be up (at least for me). In this problem we start with a set of vertices, and have a set of edges we want to embed on the grid, but the weights are initially unknown. There are different combinations of ways to layout the edges. The image shows a sub-optimal ordering of embedding connections (on the left) and an optimal embedding (on the right). On the suboptimal embedding, the orange connection is embedded last, and the direct path is now blocked, so it must make take a longer route. |
May
30 |
comment |
NP-Complete? Optimal graph embedding for a graph with specific constraints
@j_random_hacker Good point. The distance covered is in terms of the length of each individual connection. This is different from your description, which would mean a cell containing two crossing edges would be no costlier than a cell with just one edge. To make it clear, when I use my A* algorithm, for each successive 'step' from one cell to the next, the cost of the connection is increased by 1. |
May
30 |
comment |
NP-Complete? Optimal graph embedding for a graph with specific constraints
Ideally I would like to determine whether the problem is indeed NP-hard (I will look into its relationship with multicommodity flows the person above suggested). However, I would also be interested in knowing about the algorithms which provide excellent solutions |
May
30 |
awarded | Yearling |
May
30 |
asked | NP-Complete? Optimal graph embedding for a graph with specific constraints |
May
25 |
asked | Graphs: Nodes with max degree of 4, each node tries to connect to 4 nearest nodes - how many connections lost? |
May
21 |
accepted | Efficient data structure that checks for existence of String |
May
18 |
asked | Efficient data structure that checks for existence of String |
Apr
20 |
comment |
a star algorithm not taking the visually ideal route
Yes, your understanding is correct. |
Apr
20 |
accepted | a star algorithm not taking the visually ideal route |
Apr
19 |
asked | a star algorithm not taking the visually ideal route |