p-Laplacian first eigenvalues controls on Finsler manifolds

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:=g+β), where g is a Riemannian metric on M and β an appropriate 1-form on M, it is shown that the first eigenvalue λ1,p(M,F) of the Finslerian p-Laplacian defined by the Finsler metric F is controled by the first eigenvalue λ1,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.