The size of spanning disks for polygonal curves
Abstract
Let K be a closed polygonal curve in 3 consisting of n line segments. Assume that K is unknotted, so that it is the boundary of an embedded disk in 3. This paper considers the question: How many triangles are needed to triangulate a Piecewise-Linear (PL) spanning disk of K? The main result exhibits a family of unknotted polygons with n edges, n ∞, such that the minimal number of triangles needed in any triangulated spanning disk grows exponentially with n. For each integer n 0, there is a closed, unknotted, polygonal curve Kn in R3 having less than 10n+9 edges, with the property that any Piecewise-Linear triangulated disk spanning the curve contains at least 2n-1 triangles.
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