Maximizing torsional rigidity on Riemannian manifolds
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Let $\,(M,g)\,$ be a $n$-dimensional Riemannian manifold and $\,\Omega\,$ be any compact connected domain in $\,M$. We study the problem of finding the {\em maxima} of the functional $\, {\mathcal E} (\Omega)\,$ (known as {\em torsional rigidity} associated to $\Omega$) among all domains of prescribed volume $v$. Our results show that for a given Riemannian manifold which is strictly isoperimetric at one of its points the maximum of such functional is realized by the geodesic ball centered at this point. More generally, we prove estimates for the functional $\, {\mathcal E} (\Omega)\,$ by comparison with symmetrized domains. We also investigate on finding sharp upper bounds for the functional $\, {\mathcal E} (\Omega)\,$, under certain conditions on the geometry of $\,(M,g)\,$ and of $\Omega$. Finally we find an universal upper bound for $\, {\mathcal E} (\Omega)\,$ in terms of the isoperimetric Cheeger constant.
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