Published: 1996 Received: May 25, 1994Available on J-STAGE: October 20, 2006Accepted: -
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Date of correction: October 20, 2006Reason for correction: -Correction: SUBTITLEDetails: Wrong : Dedicated to Professor Mitsuru Nakai on his 60th birthday
Date of correction: October 20, 2006Reason for correction: -Correction: CITATIONDetails: Wrong : 1) H. Aogai, Picard constant of a finitely sheeted covering surfaces, Kôdai Math. Sem. Rep., 25 (1973), 219-224. 2) I. Laine, Nevanlinna theory and complex differential equations, Walter de Gruyter, Berlin, New York, 1993, p. 341. 3) G. Hiromi and K. Niino, On a characterization of regularly branched three-sheeted covering Riemann surfaces, Kôdai Math. Sem. Rep., 17 (1965), 250-260. 4) G. Hiromi and M. Ozawa, On the existence of analytic mappings between two ultrahyperelliptic surfaces, Kôdai Math. Sem. Rep., 17 (1965), 281-306. 5) K. Niino, On regularly branched three-sheeted covering Riemann surfaces, Kôdai Math. Sem. Rep., 18 (1966), 229-250. 6) K. Niino, On the functional equation (eM-γ)k(eM-δ)m-k=fm(eH-σ)k(eH-τ)m-k, Aequationes Math., 22 (1981), 293-301. 7) K. Niino, On analytic mappings between two algebroid surfaces, Complex Variables, 2 (1984), 283-293. 8) M. Ozawa, On complex analytic mappings, Kôdai Math. Sem. Rep., 17 (1965), 93-102. 9) M. Ozawa, On ultrahyperelliptic surfaces, Kôdai Math. Sem. Rep., 17 (1965), 103-108. 10) M. Ozawa and K. Niino, Surveys of analytic mappings between two Riemann surfaces, Analytic function theory of one complex variable, Pitman Research Notes in Math., 212, Longman Sci. & Tech., Essex, England, pp. 226-252. 11) M. Ozawa and K. Sawada, Three-sheeted algebroid surfaces whose Picard constants are five, Kodai Math. J., 17 (1994), 101-124. 12) M. Ozawa and K. Sawada, Picard constants of four-sheeted algebroid surfaces, I, Kodai Math. J., 17 (1994), 99-141. 13) M. Ozawa and K. Sawada, Picard constants of four-sheeted algebroid surfaces, II, Kodai Math. J., 18 (1995), 199-233. 14) K. Sawada and K. Tohge, A remark on three-sheeted algebroid surfaces whose Picard constants are five, Kodai Math. J., 18 (1995), 142-155.
Right : [1] H. Aogai, Picard constant of a finitely sheeted covering surfaces, Kôdai Math. Sem. Rep., 25 (1973), 219-224. [2] I. Laine, Nevanlinna theory and complex differential equations, Walter de Gruyter, Berlin, New York, 1993, p. 341. [3] G. Hiromi and K. Niino, On a characterization of regularly branched three-sheeted covering Riemann surfaces, Kôdai Math. Sem. Rep., 17 (1965), 250-260. [4] G. Hiromi and M. Ozawa, On the existence of analytic mappings between two ultrahyperelliptic surfaces, Kôdai Math. Sem. Rep., 17 (1965), 281-306. [5] K. Niino, On regularly branched three-sheeted covering Riemann surfaces, Kôdai Math. Sem. Rep., 18 (1966), 229-250. [7] K. Niino, On analytic mappings between two algebroid surfaces, Complex Variables, 2 (1984), 283-293. [8] M. Ozawa, On complex analytic mappings, Kôdai Math. Sem. Rep., 17 (1965), 93-102. [9] M. Ozawa, On ultrahyperelliptic surfaces, Kôdai Math. Sem. Rep., 17 (1965), 103-108. [10] M. Ozawa and K. Niino, Surveys of analytic mappings between two Riemann surfaces, Analytic function theory of one complex variable, Pitman Research Notes in Math., 212, Longman Sci. & Tech., Essex, England, pp. 226-252. [11] M. Ozawa and K. Sawada, Three-sheeted algebroid surfaces whose Picard constants are five, Kodai Math. J., 17 (1994), 101-124. [12] M. Ozawa and K. Sawada, Picard constants of four-sheeted algebroid surfaces, I, Kodai Math. J., 17 (1994), 99-141. [13] M. Ozawa and K. Sawada, Picard constants of four-sheeted algebroid surfaces, II, Kodai Math. J., 18 (1995), 199-233. [14] K. Sawada and K. Tohge, A remark on three-sheeted algebroid surfaces whose Picard constants are five, Kodai Math. J., 18 (1995), 142-155.
Date of correction: October 20, 2006Reason for correction: -Correction: PDF FILEDetails: -