Gap and rigidity theorems of $\lambda$-hypersurfaces

TL;DR

This paper investigates $mbda$-hypersurfaces, establishing gap and rigidity theorems, classifying simple cases in low dimensions, and proving a Bernstein type theorem for entire graphs with polynomial volume growth.

Contribution

It provides new gap and rigidity results for $mbda$-hypersurfaces, extending known results for self-shrinkers and classifying low-dimensional cases.

Findings

Complete $mbda$-hypersurfaces with small second fundamental form are rigid.

In $$, $mbda$-hypersurfaces with $mbda\u2265 0$ are only lines or circles.

Entire graphical $mbda$-hypersurfaces with polynomial volume growth are hyperplanes.

Abstract

We study $\lambda$-hypersurfaces that are critical points of a Gaussian weighted area functional $\int_{\Sigma} e^{-\frac{|x|^2}{4}}dA$ for compact variations that preserve weighted volume. First, we prove various gap and rigidity theorems for complete $\lambda$-hypersurfaces in terms of the norm of the second fundamental form $|A|$. Second, we show that in one dimension, the only smooth complete and embedded $\lambda$-hypersurfaces in $\mathbb{R}^2$ with $\lambda\geq 0$ are lines and round circles. Moreover, we establish a Bernstein type theorem for $\lambda$-hypersurfaces which states that smooth $\lambda$-hypersurfaces that are entire graphs with polynomial volume growth are hyperplanes. All the results can be viewed as generalizations of results for self-shrinkers.