Every Graph Admits an Unambiguous Bold Drawing
نویسنده
چکیده
Let r and w be a fixed positive numbers, w < r. In a bold drawing of a graph, every vertex is represented by a disk of radius r, and every edge by a narrow rectangle of width w. We solve a problem of van Kreveld [K09] by showing that every graph admits a bold drawing in which the region occupied by the union of the disks and rectangles representing the vertices and edges does not contain any disk of radius r other than the ones representing the vertices.
منابع مشابه
Every graph admits an unambiguous bold drawingA preliminary versionP12 of this paper was presented at the 19th International Symposium on Graph Drawing, Eindhoven, 2011
Let r and w be fixed positive numbers, w < r. In a bold drawing of a graph, every vertex is represented by a disk of radius r, and every edge by a narrow rectangle of width w. We solve a problem of van Kreveld [10] by showing that every graph admits a bold drawing in which the region occupied by the union of the disks and rectangles representing the vertices and edges does not contain any disk ...
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ورودعنوان ژورنال:
- J. Graph Algorithms Appl.
دوره 19 شماره
صفحات -
تاریخ انتشار 2011