Inverse mean curvature evolution of entire graphs (Q2113303)

The authors study the evolution of a mean-convex entire graph over \(\mathbb{R}^n\) by inverse mean curvature flow. They prove the global existence of starshaped entire graphs with superlinear growth at infinity. They study the critical case of asymptotically conical entire convex graphs and show that there exists a time \(T>0\) such that as \(t\to T\) the solution converges to a flat plane.