First eigenvalue of the Laplacian on compact surfaces for large genera

Abstract

For any Riemannian metric ds2 on a compact surface of genus g, Yang and Yau proved that the normalized first eigenvalue of the Laplacian λ1(ds2)Area(ds2) is bounded in terms of the genus. In particular, if 1(g) is the supremum for each g, it follows that the asymptotic growth of the sequence 1(g) is no larger than the one of 4π g. In this paper we improve the result and we show that \[ g\, →\, ∞ \, 1g1(g) ≤ 4(3-5)π ≈ 3.056π. \]

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