A Poincaré-type inequality and a related eigenvalue problem
arXiv:1512.08227
Abstract
Given a smooth positive function $f$ defined on the unit circle satisfying a simple condition, we obtain a Poincaré-type inequality for an arbitrary function $u$ whose weighted average with respect to $f$ is zero. The proof uses Fenchel's theorem about the total curvature of closed space curves in an essential way. Next we consider the generalization of this result to higher dimensional closed Riemannian manifold and reduce it to an eigenvalue problem. Finally, we point out that even though such Poincaré-type inequality still holds, the best constant $λ_1(f)$ might be different from the first eigenvalue $λ_1$ by constructing explicit examples on the standard spheres and flat tori.
11 pages. Any comments are welcome