Convex Polygons with Parallel Opposite Sides: Convergence, Reconstruction, and Isoperimetric Inequalities

Abstract

In this paper, we study affine λ-equidistants of convex polygons with parallel opposite sides (CPPOSes), introduced by M. Craizer et al. (Polygons with Parallel Opposite Sides, Discrete & Computational Geometry 50 (2013), 474-490), and relate them to affine λ-equidistants of smooth convex curves. We show how, and under which conditions, the original CPPOS can be reconstructed from its Wigner caustic and centre symmetry set. We prove a discrete version of the improved isoperimetric inequality: L(P)2≥slant 8n(π2n)·( A( P)+2|A(E0.5( P))|), where P is a CPPOS with 2n vertices, L(P) is its perimeter, A(P) is the area enclosed by P, and A(E0.5( P)) denotes the oriented area of the Wigner caustic of P. Moreover, equality holds if and only if P is an equiangular CPPOS of constant width. We also prove sharp area estimates for the oriented areas of the Wigner caustic and the centre symmetry set of a CPPOS. More precisely, we show that the absolute value of the oriented area of the Wigner caustic is at most one quarter of the area of P, while the absolute value of the oriented area of the centre symmetry set is at most the area of P. Both bounds are sharp.