A sharp lower bound on the small eigenvalues of surfaces
Abstract
Let S be a compact hyperbolic surface of genus g≥ 2 and let I(S) = 1Vol(S)∫S 1Inj(x)2 1 dx, where Inj(x) is the injectivity radius at x. We prove that for any k∈ \1,…, 2g-3\, the k-th eigenvalue λk of the Laplacian satisfies equation* λk ≥ c k2I(S) g2 \, , equation* where c>0 is some universal constant. We use this bound to prove the heat kernel estimate equation* 1Vol(S) ∫S | pt(x,x) -1Vol(S) | ~dx ≤ C I(S)t ∀ t ≥ 1 \, , equation* where C<∞ is some universal constant. These bounds are optimal in the sense that for every g≥ 2 there exists a compact hyperbolic surface of genus g satisfying the reverse inequalities with different constants.
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