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ISAAC
1998
Springer
1998
Springer
Generalized Self-Approaching Curves
Abstract. We consider all planar oriented curves that have the following property depending on a fixed angle . For each point B on the curve, the rest of the curve lies inside a wedge of angle with apex in B. This property restrains the curve's meandering, and for 2 this means that a point running along the curve always gets closer to all points on the remaining part. For all < , we provide an upper bound c() for the length of such a curve, divided by the distance between its endpoints, and prove this bound to be tight. A main step is in proving that the curve's length cannot exceed the perimeter of its convex hull, divided by 1 + cos .
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| Added | 06 Aug 2010 |
| Updated | 06 Aug 2010 |
| Type | Conference |
| Year | 1998 |
| Where | ISAAC |
| Authors | Oswin Aichholzer, Franz Aurenhammer, Christian Icking, Rolf Klein, Elmar Langetepe, Günter Rote |
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