Publication Date:
2008
abstract:
For any convex n-gon P we consider the polygons obtained by dropping a vertex or an edge of P. The area distance of P to such (n - 1)-gons, divided by the area of P, is an affinely invariant functional on n-gons whose maximizers coincide with the affinely regular polygons. We provide a complete proof of this result. We extend these area functionals to planar convex bodies and we present connections with the affine isoperimetric inequality and parallel X-ray tomography
Iris type:
01.01 Articolo in rivista
Keywords:
Affinely regular polygons; Geometric tomography; Affine length; Affine inequalities; Geometric inequalities
List of contributors:
Longinetti, Marco
Published in: