A relation between growth and the spectrum of the Laplacian

1. Berenstein, C., Zalcman, L.: Pompeiu's Problem in Symmetric Spaces. Comment. Math. Helv.55, 593–621 (1980)

   Google Scholar 

2. Bishop, R., Crittenden, R.: Geometry of Manifolds. New York-London: Academic Press 1964

   Google Scholar 

3. Brooks, R.: Exponential Growth and the Spectrum of the Laplacian. Proc. Amer. Math. Soc.82, 473–477 (1981)

   Google Scholar 

4. Brooks, R.: The Fundamental Group and the Spectrum of the Laplacian. Preprint

5. Cheeger, J.: A Lower Bound for the Smallest Eigenvalue of the Laplacian. In: Problems in analysis (Ed. R.C. Gunning). A Symposium in Honor of Salomon Bochner (Princeton 1969), pp. 195–199. Princeton: Princeton University Press 1970

   Google Scholar 

6. Cheng, S. Y.: Eigenvalue Comparison Theorems and its Geometric Applications. Math. Z.143, 289–297 (1975)

   Google Scholar 

7. Donnelly, H.: On the Essential Spectrum of a Complete Riemannian Manifold. Topology20, 1–14 (1981)

   Google Scholar 

8. Donnelly, H., Li, P.: Pure Point Spectrum and Negative Curvature for Non-Compact Manifolds. Duke Math. J.46, 497–503 (1979)

   Google Scholar 

9. McKean, H. P. An Upper Bound to the Spectrum of Δ on a Manifold of Negative Curvature. J. Differential Geometry4, 359–366 (1970)

   Google Scholar 

10. Milnor, J.: A Note on Curvature and Fundamental Group. J. Differential Geometry2, 1–7 (1968)

    Google Scholar 

11. Pinsky, M.: The Spectrum of the Laplacian on a Manifold of Negative Curvature I. J. Differential Geometry13, 87–91 (1978)

    Google Scholar 

12. Pinsky, M.: An Improved Bound for the Spectrum of the Laplacian. Preprint

13. Yau, S. T.: Isoperimetric Constants and the First Eigenvalue of a Complete Riemannian Manifold. Ann. Sci. Ecole Norm. Sup. (4)8, 487–507 (1975)

    Google Scholar 

14. Baider, A.: Noncompact Manifolds with Discrete Spectra. J. Differential Geometry14, 41–57 (1979)

    Google Scholar 

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