The concept of center as an equivariant map and a proof of an analogue of the center conjecture for equifacetal simplices

Abstract

Several authors have remarked the convenience of understanding the different notions of center appearing in Geometry (centroid of a set of points, incenter of a triangle, center of a conic and many others) as functions. The most general way to do so is to define centers as equivariant maps between G-spaces. In this paper, we prove that, under certain hypothesis, for any two G-spaces A, X, for every V∈ A and for every point P∈ X fixed by the symmetry group of V, there exists some equivariant map Z: A X such that Z(V)=P. As a consequence of this fact, we prove an analogue (for non-neccessarily continuous centers) of the center conjecture for equifacetal simplices, proposed by A. L. Edmonds.