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Sharp isoanisotropic estimates for fundamental frequencies of membranes and connections with shapes arxiv.org/abs/2406.18683

Sharp isoanisotropic estimates for fundamental frequencies of membranes and connections with shapes

The underlying motivation of the present work lies on one of the cornerstone problems in spectral optimization that consists of determining sharp lower and upper uniform estimates for fundamental frequencies of a set of uniformly elliptic operators on a given membrane. Our approach allows to give a complete solution of the problem for the general class of anisotropic operators in divergence form generated by arbitrary norms on R^2, including the computation of optimal constants and the characterization of all anisotropic extremizers. Such achievements demand that isoanisotropic type problems be addressed within the broader environment of nonnegative, convex and 1-homogeneous anisotropies and involve a deep and fine analysis of least energy levels associated to anisotropies with maximum degeneracy. As a central outcome we find out a key close relation between shapes and fundamental frequencies for rather degenerate elliptic operators. Our findings also permit to establish that the supremum of anisotropic fundamental frequencies over all fixed-area membranes is infinite for any nonzero anisotropy. This particularly proves the well-known maximization conjecture for fundamental frequencies of the p-laplacian for any p other than 2. Our new sharp lower estimate is just the planar isoanisotropic counterpart of the Faber-Krahn isoperimetric inequality and for the associated optimal constant we provide optimal geometric controls through isodiametric and isoperimetric shape optimization.

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