arXiv:1709.09867 Abstract | arXiv Analytics

arXiv:1709.09867 [math.DG]Abstract References Reviews Resources

The $1$-Yamabe equation on graph

Published 2017-09-28Version 1

We study the following $1$-Yamabe equation on a connected finite graph $$\Delta_1u+g\mathrm{Sgn}(u)=h|u|^{\alpha-1}\mathrm{Sgn}(u),$$ where $\Delta_1$ is the discrete $1$-Laplacian, $\alpha>1$ and $g, h>0$ are known. We show that the above $1$-Yamabe equation always has a nontrivial solution $u\geq0$, $u\neq0$.

Comments: 10 pages. All comments are welcome

Categories: math.DG, math.AP

Keywords: yamabe equation, connected finite graph, nontrivial solution

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arXiv:1709.09867 [math.DG]Abstract References Reviews Resources

The $1$-Yamabe equation on graph

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The $1$-Yamabe equation on graph

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arXiv:1709.09867 [math.DG]Abstract References Reviews Resources