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There's a graph with a lot of nodes, and very few edges between them - the problem is assigning numbers to nodes, so that most nodes are from i to i+1 or otherwise close.

My problem is about printing graph data nicely, but an algorithm just like that is part of pretty much every compiler (intermediate code is just a graph, produced object code gets memory locations).

I thought it was just straightforward depth-first search, but results of that aren't that great - it seems to minimize number of links back well enough, but ones it leaves tend to be horrible (like 1 -> 500 -> 1).

Any better ideas?

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what do you mean by "so that most nodes are from i to i+1 or otherwise close."? –  Assaf Lavie Jul 18 '10 at 20:28
@Assaf: I would define it as tagging the N nodes of a graph with unique numbers from {1,2,...,N} so that the sum of deltas of all connected pairs it minimal. Is this correct? –  Eyal Schneider Jul 18 '10 at 20:49
this could be a very interesting problem if I could only understand what you mean... is it like a Hamiltonian path problem? "i to i+1" between as many nodes as possible? –  mvds Jul 18 '10 at 20:53
i believe OP means "most edges are from node i to node i+1". Once we have that, though, how do you quantify "or otherwise close"? –  grossvogel Jul 18 '10 at 20:55

1 Answer 1

up vote 4 down vote accepted

This paper discusses this problem, if you use Eyal Schneider's formulation of minimizing the sum of the edge deltas (absolute value of the difference between the endpoints' labels). It's under #2, Optimal Linear Arrangements.

Sadly, there's no algorithm given for achieving an optimal ordering (or labeling), and the general problem is NP-complete. There are references to some polynomial-time algorithms for trees, though.

If you want to get into the academic stuff, google gives lots of hits for "Optimal Linear Arrangements".

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