A p-th Yamabe equations on graph
arXiv:1611.04906
Abstract
Assume $α\geq p>1$. Consider the following $p$-th Yamabe equation on a connected finite graph $G$: $$Î_pÏ+hÏ^{p-1}=λfÏ^{α-1},$$ where $Î_p$ is the discrete $p$-Laplacian, $h$ and $f>0$ are fixed real functions defined on all vertices. We show that the above equation always has a positive solution $Ï$ for some constant $λ\in\mathds{R}$.
7 pages