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COMGEO
2007
ACM
2007
ACM
Graph drawings with few slopes
The slope-number of a graph G is the minimum number of distinct edge slopes in a straight-line drawing of G in the plane. We prove that for Δ 5 and all large n, there is a Δ-regular n-vertex graph with slope-number at least n1− 8+ε Δ+4 . This is the best known lower bound on the slope-number of a graph with bounded degree. We prove upper and lower bounds on the slope-number of complete bipartite graphs. We prove a general upper bound on the slope-number of an arbitrary graph in terms of its bandwidth. It follows that the slope-number of interval graphs, cocomparability graphs, and AT-free graphs is at most a function of the maximum degree. We prove that graphs of bounded degree and bounded treewidth have slope-number at most O(logn). Finally we prove that every graph has a drawing with one bend per edge, in which the number of slopes is at most one more than the maximum degree. In a companion paper, planar drawings of graphs with few slopes are also considered. © 2006 Elsevier ...
Real-time TrafficApplied Computing | COMGEO 2007 | Complete Bipartite Graphs | Lower Bounds | Δ-regular N-vertex Graph |
Related Content
| Added | 12 Dec 2010 |
| Updated | 12 Dec 2010 |
| Type | Journal |
| Year | 2007 |
| Where | COMGEO |
| Authors | Vida Dujmovic, Matthew Suderman, David R. Wood |
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