Convergence and smoothness analysis of subdivision rules in Riemannian and symmetric spaces (Q623376)

Here the authors study sequential data living in Riemannian manifolds and in symmetric spaces. The authors observe that subdivision rules defined with intrinsic means in Cartan-Hadamard manifolds converge for all input data, which is a much stronger result than those usually available for manifold subdivision rules. Finally, they discuss \(C^1\) and \(C^2\) smoothness of limit curves.