On Some Basic Results Related to Affine Functions on Riemmanian Manifolds

Abstract

We study some basic properties of the function f0:M→ on Hadamard manifolds defined by f0(x):= u0,x0-1xfor any x∈ M. A characterization for the function to be linear affine is given and a counterexample on Poincar\'e plane is provided, which in particular, shows that assertions (i) and (ii) claimed in [Proposition 3.4]Papa2009 are not true, and that the function f0 is indeed not quasi-convex. Furthermore, we discuss the convexity properties of the sub-level sets of the function on Riemannian manifolds with constant sectional curvatures.