arXiv:2003.04400 Abstract | arXiv Analytics

arXiv:2003.04400 [math.AP]Abstract References Reviews Resources

Optimal power in Liouville theorems

Published 2020-03-09Version 1

Consider the equation div$(\varphi^2 \nabla \sigma)=0$ in $\mathbb{R}^N,$ where $\varphi>0$. It is well-known that if there exists $C>0$ such that $\int_{B_R}(\varphi \sigma)^2 dx\leq CR^2$ for every $R\geq 1$ then $\sigma$ is necessarily constant. In this paper we prove that this result is not true if we replace $R^2$ by $R^k$ for $k>2$ in any dimension $N$.

Comments: 3 pages

Categories: math.AP

Keywords: liouville theorems, optimal power, equation div, well-known

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