Heinz mean curvature estimates in warped product spaces M×eN

Abstract

If a graph submanifold (x,f(x)) of a Riemannian warped product space (Mm×eNn,g=g+e2h) is immersed with parallel mean curvature H, then we obtain a Heinz type estimation of the mean curvature. Namely, on each compact domain D of M, m\|H\|≤ A(∂ D)V(D) holds, where A(∂ D) and V(D) are the -weighted area and volume, respectively. In particular, H=0 if (M,g) has zero weighted Cheeger constant, a concept recently introduced by D.\ Impera et al.\ ([Im]). This generalizes the known cases n=1 or =0. We also conclude minimality using a closed calibration, assuming (M,g*) is complete where g*=g+e2f*h, and for some constants α≥ δ≥ 0, C1>0 and β∈ [0,1), \|∇*\|2g*≤ δ, Ricci,g*≥ α, and detg(g*)≤ C1 r2β holds when r +∞, where r(x) is the distance function on (M,g*) from some fixed point. Both results rely on expressing the squared norm of the mean curvature as a weighted divergence of a suitable vector field.