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On the first eigenvalue of the laplacian on compact surfaces of genus three
Published 28 Oct 2020 in math.DG, math-ph, and math.MP | (2010.14857v3)
Abstract: For any compact riemannian surface of genus three $(\Sigma,ds2)$ Yang and Yau proved that the product of the first eigenvalue of the Laplacian $\lambda_1(ds2)$ and the area $Area(ds2)$ is bounded above by $24\pi$. In this paper we improve the result and we show that $\lambda_1(ds2)Area(ds2)\leq16(4-\sqrt{7})\pi \approx 21.668\,\pi$. About the sharpness of the bound, for the hyperbolic Klein quartic surface numerical computations give the value $\approx 21.414\,\pi$.
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