On a sharp form of curvature conjecture for minimal graphs

Abstract

Recently, the author and Melentijevi\'c resolved the longstanding Gaussian curvature problem by proving the sharp inequality \[ |K| < c0 = π22 \] for minimal graphs over the unit disk, evaluated at the point of the graph lying directly above the origin. The constant \( c0 \) is known as the Heinz constant. Building on this result, we obtain an improved estimate for the Hopf constant \( c1 \). In addition, we show that for any prescribed unit normal vector \( n \), there exists a minimal graph over the unit disk -- bending in the coordinate directions -- whose Gaussian curvature at the point above the origin is strictly smaller, yet arbitrarily close to, the curvature of the associated Scherk-type surface with the same normal, situated above a bicentric quadrilateral. This sharp inequality strengthens the classical result of Finn and Osserman, which applies in the special case when the unit normal is \( (0,0,1) \).