A stochastic approach to a Liouville property for plurisubharmonic functions
Hiroshi KANEKO
著者情報
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Hiroshi KANEKO
Department of Mathematical Sciences College of Engineering University of Osaka Prefecture
ジャーナル
フリー
1989 年 41 巻 2 号 p. 291-299
詳細
- Published: 1989 Received: 1987/12/07 Available on J-STAGE: 2006/10/20 Accepted: - Advance online publication: - Revised: -
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訂正情報
訂正日: 2006/10/20 訂正理由: - 訂正箇所: 引用文献情報 訂正内容: Wrong : 1) E. Bedford and B. A. Taylor, Variational properties of the complex Monge-Ampère equation I, Dirichlet principle, Duke Math. J., 45 (1978), 375-403.
2) E. Bedford and B. A. Taylor, A new capacity for plurisubharmonic functions, Acta Math., 149 (1982), 1-44.
3) D. Burns, Curvature of Monge-Ampère foliation and parabolic manifolds, Ann. Math., 115 (1982), 349-373.
4) E. D. Dynkin, Markov Processes, Springer, 1965.
5) M. Fukushima, Dirichlet forms and Markov processes, North-Holland and Kodansha, 1980.
6) M. Fukushima, On holomorphic diffusions and plurisubharmonic functions, in “Geometry of Random Motion” Contemporary Mathematics, to appear.
7) M. Fukushima, On the continuity of plurisubharmonic functions along conformal diffusions, Osaka J. Math., 23 (1986), 69-75.
8) M. Fukushima and M. Okada, On conformal martingale diffusions and pluripolar set, J. Funct. Anal., 55 (1984), 377-388.
9) M. Fukushima and M. Okada, On Dirichlet forms for plurisubharmonic functions, Acta Math., 159 (1988), 171-214.
10) R. H. Greene and H. Wu, Function theory on manifolds which possesses a pole, Lecture Notes in Math., 699, Springer, 1979.
11) R. H. Greene and H. Wu, Gap theorems for non-compact Riemannian manifolds, Duke Math. J., 49 (1982), 731-756.
12) N. Mok, Y. T. Siu and S. T. Yau, The Poincaré-Lelong equation on complete Kähler manifolds, Comp. Math., 44 (1981), 183-218.
13) Y. T. Siu and S. T. Yau, Complete Kähler manifolds with non-positive curvature of faster than quadratic decay, Ann. Math., 105 (1977), 235-264.
14) W. Stoll, The Ahlfors-Weyl theorem of meromorphic maps on parabolic manifolds, Lecture Notes in Math., 981, Springer, 1983.
15) K. Takegoshi, A non-existence theorem for plurisubharmonic maps of finite energy, Math. Z., 192 (1986), 21-27.
16) K. Takegoshi, Energy estimates and Liouville theorems for harmonic maps, Max-Planck-Institut für Mathematik, preprint.
17) H. Wu, On a problem concerning the intrinsic characterization of Cn, Math. Ann., 246 (1979), 15-22.
Right : [1] E. Bedford and B. A. Taylor, Variational properties of the complex Monge-Ampère equation I, Dirichlet principle, Duke Math. J., 45 (1978), 375-403.
[2] E. Bedford and B. A. Taylor, A new capacity for plurisubharmonic functions, Acta Math., 149 (1982), 1-44.
[3] D. Burns, Curvature of Monge-Ampère foliation and parabolic manifolds, Ann. Math., 115 (1982), 349-373.
[4] E. D. Dynkin, Markov Processes, Springer, 1965.
[5] M. Fukushima, Dirichlet forms and Markov processes, North-Holland and Kodansha, 1980.
[6] M. Fukushima, On holomorphic diffusions and plurisubharmonic functions, in “Geometry of Random Motion” Contemporary Mathematics, to appear.
[7] M. Fukushima, On the continuity of plurisubharmonic functions along conformal diffusions, Osaka J. Math., 23 (1986), 69-75.
[8] M. Fukushima and M. Okada, On conformal martingale diffusions and pluripolar set, J. Funct. Anal., 55 (1984), 377-388.
[9] M. Fukushima and M. Okada, On Dirichlet forms for plurisubharmonic functions, Acta Math., 159 (1988), 171-214.
[10] R. H. Greene and H. Wu, Function theory on manifolds which possesses a pole, Lecture Notes in Math., 699, Springer, 1979.
[11] R. H. Greene and H. Wu, Gap theorems for non-compact Riemannian manifolds, Duke Math. J., 49 (1982), 731-756.
[12] N. Mok, Y. T. Siu and S. T. Yau, The Poincaré-Lelong equation on complete Kähler manifolds, Comp. Math., 44 (1981), 183-218.
[13] Y. T. Siu and S. T. Yau, Complete Kähler manifolds with non-positive curvature of faster than quadratic decay, Ann. Math., 105 (1977), 235-264.
[14] W. Stoll, The Ahlfors-Weyl theorem of meromorphic maps on parabolic manifolds, Lecture Notes in Math., 981, Springer, 1983.
[15] K. Takegoshi, A non-existence theorem for plurisubharmonic maps of finite energy, Math. Z., 192 (1986), 21-27.
[16] K. Takegoshi, Energy estimates and Liouville theorems for harmonic maps, Max-Planck-Institut für Mathematik, preprint.
[17] H. Wu, On a problem concerning the intrinsic characterization of Cn, Math. Ann., 246 (1979), 15-22.
訂正日: 2006/10/20 訂正理由: - 訂正箇所: PDFファイル 訂正内容: -
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