Affine isoperimetric inequalities for piecewise linear surfaces
Abstract
This paper considers affine analogues of the isoperimetric inequality in the sense of piecewise linear topology. Given a closed polygon P embedded in Rd having n edges, we give upper and lower bounds for the minimal number of triangles needed to forma triangulated embedded orientable surface in Rd having P as its geometric boundary. The most interesting case is dimension dimension 3, where we give an upper bound of 7 n2 triangles, and a lower bound for some polygons P that require at least 1/2 n2 triangles. In dimension 2 and dimensions 5 and above one needs only O(n) triangles. The case of dimension 4 is not completely resolved.
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