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The existence of bounded harmonic functions on C-H manifolds

Published online by Cambridge University Press:  17 April 2009

Qing Ding  and
Detang Zhou
Qing Ding
Affiliation:
Institute of MathematicsFudan UniversityShanghai 200433China
Detang Zhou
Affiliation:
Department of MathematicsShandong UniversityJinan, Shandong 250100China
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Abstract

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Let M be a Cartan-Hadamard manifold of dimension n (n ≥ 2). Suppose that M satisfies for every x > M outside a compact set an inequality:

where b, A are positive constants and A > 4. Then M admits a wealth of bounded harmonic functions, more precisely, the Dirichlet problem of the Laplacian of M at infinity can be solved for any continuous boundary data on Sn−1(∞).

Information

Type
Research Article
Information
Bulletin of the Australian Mathematical Society , Volume 53 , Issue 2 , April 1996 , pp. 197 - 207
Copyright
Copyright © Australian Mathematical Society 1996

References

[1]Anderson, M.T., ‘The Dirichlet problem at infinity for manifold of negative curvature’, J. Differential Geom. 18 (1983), 701721.CrossRefGoogle Scholar
[2]Anderson, M.T. and Schoen, R., ‘Positive harmonic function on complete manifolds of negative curvature’, Ann. of Math 121 (1985), 420461.CrossRefGoogle Scholar
[3]Ballmann, W., ‘Dirichlet problem at infinity for manifold of nonpositive curvature’, Form. Math. 1 (1990), 201213.Google Scholar
[4]Chen, J.C. and Li, J.Y., ‘A remark on eigenvalues’, Chinese Sci. Bull. 9 (1989), 655658.Google Scholar
[5]Ding, Q., ‘The Dirichlet problem at infinity for manifolds of nonpositive curvature’, in Differential geometry, (Gu, C.H., Hu, H.S., and Xin, Y.L., Editors) (World Sci. Publ. Co., Hong Kong, 1993), pp. 4958.Google Scholar
[6]Greene, R. and Wu, H., Function theory on manifolds which possess a pole, Lecture Notes in Mathematics 699 (Spring-Verlag, Berlin, Heidelberg, New York, 1979).CrossRefGoogle Scholar
[7]Milnor, J., ‘On deciding whether a surface is parabolic or hyperbolic’, Amer. Math. Monthly 84 (1977), 4346.CrossRefGoogle Scholar
[8]Sullivan, D., ‘The Dirichlet problem at infinity for negative curved manifold’, J. Differential Geom. 18 (1983), 723732.CrossRefGoogle Scholar
[9]Yau, S.T., ‘Harmonic functions on complete Riemannian manifold’, Comm. Pure Appl. Math. 28 (1975), 201228.CrossRefGoogle Scholar
[10]Yau, S.T., ‘Some function-theoretic properties of complete Riemannian manifolds and their applications to geometry’, Indiana Univ. Math. J. 25 (1976), 659670.CrossRefGoogle Scholar