# $p$-Laplacian first eigenvalues controls on Finsler manifolds

**Authors:** Cyrille Combete, Serge Degla, Leonard Todjihounde

arXiv: 1704.01402 · 2017-04-06

## TL;DR

This paper establishes bounds on the first eigenvalue of the Finslerian p-Laplacian on Finsler manifolds, relates it to Riemannian eigenvalues in Randers cases, and extends Cheeger's inequality to the p-Laplacian.

## Contribution

It provides new bounds for the first eigenvalue of the Finslerian p-Laplacian and extends Cheeger's inequality to this setting, including specific results for Randers manifolds.

## Key findings

- First eigenvalue bounded by geometric constants.
- Eigenvalue control in Randers manifolds via Riemannian eigenvalues.
- Extension of Cheeger's inequality to Finsler p-Laplacian.

## Abstract

Given a Finsler manifold $(M,F)$, it is proved that the first eigenvalue of the Finslerian $p$-Laplacian is bounded above by a constant depending on $\ p$, the dimension of $M$, the Busemann-Hausdorff volume and the reversibility constant of $(M,F)$.   For a Randers manifold $(M,F:=\sqrt{g}+\beta)$, where $g$ is a Riemannian metric on $M$ and $\beta$ an appropriate $1$-form on $M$, it is shown that the first eigenvalue $\lambda_{1,p}(M,F)$ of the Finslerian $p$-Laplacian defined by the Finsler metric $F$ is controled by the first eigenvalue $\lambda_{1,p}(M,g)$ of the Riemannian $p$-Laplacian defined on $(M,g)$.   Finally, the Cheeger's inequality for Finsler Laplacian is extended for $p$-Laplacian, with $p > 1$.

## Full text

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## References

18 references — full list in the complete paper: https://tomesphere.com/paper/1704.01402/full.md

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Source: https://tomesphere.com/paper/1704.01402