Families of similar simplices inscribed in most smoothly embedded spheres

Abstract

Let denote a non-degenerate k-simplex in Rk. The set Sim() of simplices in Rk similar to is diffeomorphic to O(k)× [0,∞)× Rk, where the factor in O(k) is a matrix called the pose. Among (k-1)-spheres smoothly embedded in Rk and isotopic to the identity, there is a dense family of spheres, for which the subset of Sim() of simplices inscribed in each embedded sphere contains a similar simplex of every pose U∈ O(k). Further, the intersection of Sim() with the configuration space of k+1 distinct points on an embedded sphere is a manifold whose top homology class maps to the top class in O(k) via the pose map. This gives a high dimensional generalization of classical results on inscribing families of triangles in plane curves. We use techniques established in our previous paper on the square-peg problem where we viewed inscribed simplices in spheres as transverse intersections of submanifolds of compactified configuration spaces.

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