Power concavity for elliptic and parabolic boundary value problems on rotationally symmetric domains

Kazuhiro Ishige, Paolo Salani, Asuka Takatsu

Published 2020-02-24Version 1

We study power concavity of rotationally symmetric solutions to elliptic and parabolic boundary value problems on rotationally symmetric domains in Riemannian manifolds. As applications of our results to the hyperbolic space ${\bf H}^N$ we have: $\bullet$ The first Dirichlet eigenfunction on a ball in ${\bf H}^N$ is strictly positive power concave; $\bullet$ Let $\Gamma$ be the heat kernel on ${\bf H}^N$. Then $\Gamma(\cdot,y,t)$ is strictly log-concave on ${\bf H}^N$ for $y\in {\bf H}^N$ and $t>0$.