Reilly type inequality for the first eigenvalue of the $L_{r; F}$ operator
Abstract: Given a positive function $F$ on $\mathbb Sn$ which satisfies a convexity condition, for $1\leq r\leq n$, we define for hypersurfaces in $\mathbb{R}{n+1}$ the $r$-th anisotropic mean curvature function $H_{r; F}$, a generalization of the usual $r$-th mean curvature function. We also define $L_{r; F}$ operator, the linearized operator of the $r$-th anisotropic mean curvature, which is a generalization of the usual $L_r$ operator for hypersurfaces in the Euclidean space $\mathbb R{n+1}$. The Reilly type inequalities for the first eigenvalue of the $L_{r; F}$ operator have been proved.
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