Poincar\'e inequality on minimal graphs over manifolds and applications

Abstract

Let B2(p) be an n-dimensional smooth geodesic ball with Ricci curvature ≥-(n-1)2 for some ≥0. We establish the Sobolev inequality and the uniform Neumann-Poincar\'e inequality on each minimal graph over B1(p) by combining Cheeger-Colding theory and the current theory from geometric measure theory, where the constants in the inequalities only depends on n, , the lower bound of the volume of B1(p). As applications, we derive gradient estimates and a Liouville theorem for a minimal graph M over a smooth complete noncompact manifold of nonnegative Ricci curvature and Euclidean volume growth. Furthermore, we can show that any tangent cone of at infinity splits off a line isometrically provided the graphic function of M admits linear growth.