The geometry of Grassmannian manifolds and Bernstein type theorems for higher codimension

TL;DR

This paper explores a specific region in Grassmannian manifolds to derive stronger Bernstein type theorems for higher codimension submanifolds with parallel mean curvature, expanding the scope of geometric analysis.

Contribution

It identifies a new region in Grassmannian manifolds that allows for improved a priori estimates and stronger Bernstein theorems in higher codimension geometry.

Findings

Defined a new region in Grassmannian manifolds with key properties.

Constructed strongly subharmonic functions for the Gauss map.

Established stronger Bernstein type theorems for higher codimension submanifolds.

Abstract

We identify a region $\Bbb{W}_{\f{1}{3}}$ in a Grassmann manifold $\grs{n}{m}$, not covered by a usual matrix coordinate chart, with the following important property. For a complete $n-$submanifold in $\ir{n+m} \, (n\ge 3, m\ge2)$ with parallel mean curvature whose image under the Gauss map is contained in a compact subset $K\subset\Bbb{W}_{\f{1}{3}}\subset\grs{n}{m}$, we can construct strongly subharmonic functions and derive a priori estimates for the harmonic Gauss map. While we do not know yet how close our region is to being optimal in this respect, it is substantially larger than what could be achieved previously with other methods. Consequently, this enables us to obtain substantially stronger Bernstein type theorems in higher codimension than previously known.