On the Willmore functional of 2-tori in some product Riemannian manifolds

Abstract

We discuss the minimum of Willmore functional of torus in a Riemannian manifold N, especially for the case that N is a product manifold. We show that when N=S2× S1, the minimum of W(T2) is 0, and when N=R2× S1, there exists no torus having least Willmore functional. When N=H2(-c)× S1, and x=γ× S1, the minimum of W(x) is 2π2c.