Conformal Embeddings via Heat Kernel

Abstract

For any n-dimensional compact Riemannian Manifold M with smooth metric g, by employing the heat kernel embedding introduced by Bérard-Besson-Gallot'94, we intrinsically construct a canonical family of conformal embeddings Ct,k: M→Rq(t), with t>0 sufficiently small, q(t) t-n2, and k as a function of O(tl) in proper sense. Our approach involves finding all these canonical conformal embeddings, which shows the distinctions from the isometric embeddings introduced by Wang-Zhu'15.