The kth Order Preserving Sets and Isoperimetric Type Inequalities for Planar Ovals

Abstract

In this work, we introduce and investigate a new class of sets, the kth Order Preserving Sets, arising naturally from the Fourier analysis of support functions associated with hedgehogs. Specifically, we focus on sets whose support functions possess a Fourier series that preserves only terms with positive indices divisible by a fixed k. We explore the geometry of the kth Order Midpoint Set, defined as the set of centroids of all equiangular k-gons circumscribed about a given hedgehog. This set captures essential structural and symmetry-related features of the underlying geometric configuration. We study the geometric properties of such sets and, in particular, establish an isoperimetric-type inequality relating the perimeter and area of a region bounded by a simple smooth convex closed curve (an oval) O: \[ LO2 - 4π AO ≥slant 4π |APk| + 2π |A_O,k|, \] where LO denotes the length (perimeter) of O, AO is the area of the region enclosed by O, APk is the oriented area of the associated kth Order Preserving Set Pk, and A_O,k is the oriented area of the associated kth Order Midpoint Set O,k. Moreover, we characterize the equality case: the inequality becomes an equality if and only if every equiangular circumscribed k-gon around O is a~regular k-gon with its center of mass located at the Steiner point of O.