We combine the heat kernel embedding and Guntherâ€™s implicit function theorem to obtain isometric embeddings of compact Einstein manifolds into Euclidean spaces. As the heat flow time t->0, the second fundamental form of the embedded images has certain normal form, and the mean curvature vectors converge to (large) constant length. These embeddings are canonical in the sense that they are constructed by the eigenfunctions of the Laplacian and intrinsic perturbations. This is a joint work with Xiaowei Wang.