Isospectral surfaces of small genus

Roberts Brooks; Richard Tse

doi:10.1017/S0027763000002518

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In this note, we will construct simple examples of isospectral surfaces. In what follows, we will use the term “surface” to mean a surface endowed with a Riemannian metric, while the term “Riemann surface” will be reserved for a surface endowed with a metric of constant curvature. We will show:

THEOREM 1. There exist pairs of surfaces S1 and S2 of genus 3, such that S1 and S2 are isospectral but not isometric.

THEOREM 2. There exist pairs of Riemann surfaces S1 and S2 of genus 4 and 6, which are isospectral but not isometric.

THEOREM 3. There exist unoriented surfaces S1 and S2 of Euler characteristic X(S1) = X(S2) = — 6 which are isospectral but not isometric.

References

[1] Beardon, A., The Geometry of Discontinuous Groups, Springer Verlag 1983.Google Scholar

[2] Brooks, R., On manifolds of negative curvature with isospectral potentials, Topology, 26 (1987), 63–66.CrossRef Google Scholar

[3] Buser, P., Isospectral Riemann surfaces, Ann. Inst. Fourier, XXXVI (1986), 167–192.CrossRef Google Scholar

[4] Guralnick, R., Subgroups inducing the same permutation representation, J. Algebra, 81 (1983), 312–319.CrossRef Google Scholar

[5] Sunada, T., Riemannian coverings and isospectral manifolds, Ann. of Math., 121 (1985), 169–186.CrossRef Google Scholar

[6] Vigneras, M. F., Variétés riemannienes isospectrales et non isometriques, Ann. of Math., 112 (1980), 21–32.CrossRef Google Scholar

Crossref Citations

This article has been cited by the following publications. This list is generated based on data provided by Crossref.

Buser, Peter 1988. Geometry and Analysis on Manifolds. Vol. 1339, Issue. , p. 64.

Brooks, Robert 1988. Holomorphic Functions and Moduli I. Vol. 10, Issue. , p. 203.

Brooks, Robert 1988. Constructing Isospectral Manifolds. The American Mathematical Monthly, Vol. 95, Issue. 9, p. 823.

Deturck, Dennis M. Gordon, Carolyn S. and Lee, Kyung Bai 1989. Isospectral deformations II: Trace formulas, metrics, and potentials. Communications on Pure and Applied Mathematics, Vol. 42, Issue. 8, p. 1067.

DeTurck, Dennis Gluck, Herman Gordon, Carolyn and Webb, David 1989. You can not hear the mass of a homology class. Commentarii Mathematici Helvetici, Vol. 64, Issue. 1, p. 589.

Perry, Peter A. 1989. Schrödinger Operators. Vol. 345, Issue. , p. 401.

Gordon, Carolyn S. 1989. When you can’t hear the shape of a manifold. The Mathematical Intelligencer, Vol. 11, Issue. 3, p. 39.

Brooks, Robert Perry, Peter and Yang, Paul 1989. Isospectral sets of conformally equivalent metrics. Duke Mathematical Journal, Vol. 58, Issue. 1,

Brooks, Robert and Gordon, Carolyn 1990. Isospectral families of conformally equivalent Riemannian metrics. Bulletin of the American Mathematical Society, Vol. 23, Issue. 2, p. 433.

Gordon, Carolyn Webb, David L. and Wolpert, Scott 1992. One cannot hear the shape of a drum. Bulletin of the American Mathematical Society, Vol. 27, Issue. 1, p. 134.

Gordon, C. Webb, D. and Wolpert, S. 1992. Isospectral plane domains and surfaces via Riemannian orbifolds. Inventiones Mathematicae, Vol. 110, Issue. 1, p. 1.

Bérard, Pierre 1992. Transplantation et isospectralité. I. Mathematische Annalen, Vol. 292, Issue. 1, p. 547.

Gordon, Carolyn S. 1992. New Developments in Lie Theory and Their Applications. Vol. 105, Issue. , p. 129.

Gordon, Carolyn 1993. Isospectral closed Riemannian manifolds which are not locally isometric. Journal of Differential Geometry, Vol. 37, Issue. 3,

Brooks, Robert Perry, Peter and Petersen, Peter 1993. On Cheeger's inequality. Commentarii Mathematici Helvetici, Vol. 68, Issue. 1, p. 599.

Perry, Peter A. 1993. Inverse Problems in Mathematical Physics. Vol. 422, Issue. , p. 174.

Maclachlan, C. and Rosenberger, G. 1994. Small volume isospectral, non-isometric, hyperbolic 2-orbifolds. Archiv der Mathematik, Vol. 62, Issue. 1, p. 33.

Ito, Kentaro 1996. Iso-length-spectral problem for complete hyperbolic surfaces of finite type. Tohoku Mathematical Journal, Vol. 48, Issue. 4,

Gordon, Carolyn S. and Wilson, Edward N. 1997. Continuous families of isospectral Riemannian metrics which are not locally isometric. Journal of Differential Geometry, Vol. 47, Issue. 3,

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