The first eigenvalue of the Laplacian on orientable surfaces

Abstract

The famous Yang-Yau inequality provides an upper bound for the first eigenvalue of the Laplacian on an orientable Riemannian surface solely in terms of its genus γ and the area. Its proof relies on the existence of holomorhic maps to CP1 of low degree. Very recently, A.~Ros was able to use certain holomorphic maps to CP2 in order to give a quantitative improvement of the Yang-Yau inequality for γ=3. In the present paper, we generalize Ros' argument to make use of holomorphic maps to CPn for any n>0. As an application, we obtain a quantitative improvement of the Yang-Yau inequality for all genera γ>3 except for γ = 4,6,8,10,14.

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