Published: 1997 Received: February 08, 1995Available on J-STAGE: October 20, 2006Accepted: -
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Date of correction: October 20, 2006Reason for correction: -Correction: CITATIONDetails: Wrong : C) A. Candiotti, Computations of Iwasawa invariants and K2, Compositio Math., 29 (1974), 89-111. CL) J. Coates and S. Lichtenbaum, On l-adic zeta functions, Ann. of Math. (2), 98 (1973), 498-550. EM) R. Ernvall and T. Metsänkylä, Computation of the zeros of p-adic L-functions, Math. Comp., 58 (1992), 815-830. FK) T. Fukuda and K. Komatsu, On Zp-extensions of real quadratic fields, J. Math. Soc. Japan, 38 (1986), 95-102. FKW) T. Fukuda, K. Komatsu and H. Wada, A remark on the λ-invariant of real quadratic fields, Proc. Japan Acad. Ser. A, 62 (1986), 318-319. F) T. Fukuda, Iwasawa's λ-invariants of certain real quadratic fields, Proc. Japan Acad. Ser. A, 65 (1989), 260-262. FT) T. Fukuda and H. Taya, The Iwasawa A-invariants of Zp-extensions of real quadratic fields, Acta Arith., 69 (1995), 277-292. FW) B. Ferrero and L. Washington, The Iwasawa invariant μp vanishes for abelian number fields, Ann. of Math., 109 (1979), 377-395. G1) R. Greenberg, On the Iwasawa invariants of totally real number fields, Amer. J. Math., 98 (1976), 263-284. G2) R. Greenberg, On p-adic L-functions and cyclotomic fields II, Nagoya Math. J., 67 (1977), 139-158. IS1) H. Ichimura and H. Sumida, On the Iwasawa invariants of certain real abelian fields, Tohoku Math. J., 49 (1997), 203-215. IS2) H. Ichimura and H. Sumida, On the Iwasawa invariants of certain real abelian fields II, Int. J. Math., 7 (1996), 721-744. I1) K. Iwasawa, A note on class numbers of algebraic number fields, Abh. Math. Sem. Univ. Hamburg, 20 (1956), 257-258. I2) K. Iwasawa, On Γ-extensions of algebraic number fields, Bull. Amer. Math. Soc., 65 (1959), 183-226. I3) K. Iwasawa, Lectures on p-adic L-functions, Ann. of Math. Stud. no. 74, Princeton Univ. Press, Princeton, N.J. (1972). I4) K. Iwasawa, On Zl-extensions of algebraic number fields, Ann. of Math., 98 (1973), 246-326. Ku) M. Kurihara, The Iwasawa λ invariants of real abelian fields and the cyclotomic elements, preprint. Kr) J. S. Kraft, Iwasawa invariants of CM fields, J. Number Theory, 32 (1989), 65-77. KS) J. S. Kraft and R. Schoof, Computing Iwasawa modules of real quadratic number fields, Compositio Math., 97 (1995), 135-155. OT) M. Ozaki and H. Taya, A note on Greenberg's conjecture of real abelian number fields, Manuscripta Math., 88 (1995), 311-320. MW) B. Mazur and A. Wiles, Class fields of abelian extensions of Q, Invent. Math., 76 (1984), 179-330. T) H. Taya, On the Iwasawa λ-invariants of real quadratic fields, Tokyo J. Math., 16 (1993), 121-130. W) L. Washington, Introduction to Cyclotomic Fields, Graduate Texts in Math., no. 83, Springer, New York (1982).
Right : [C] A. Candiotti, Computations of Iwasawa invariants and K2, Compositio Math., 29 (1974), 89-111. [CL] J. Coates and S. Lichtenbaum, On l-adic zeta functions, Ann. of Math. (2), 98 (1973), 498-550. [EM] R. Ernvall and T. Metsänkylä, Computation of the zeros of p-adic L-functions, Math. Comp., 58 (1992), 815-830. [FK] T. Fukuda and K. Komatsu, On Zp-extensions of real quadratic fields, J. Math. Soc. Japan, 38 (1986), 95-102. [FKW] T. Fukuda, K. Komatsu and H. Wada, A remark on the λ-invariant of real quadratic fields, Proc. Japan Acad. Ser. A, 62 (1986), 318-319. [F] T. Fukuda, Iwasawa's λ-invariants of certain real quadratic fields, Proc. Japan Acad. Ser. A, 65 (1989), 260-262. [FT] T. Fukuda and H. Taya, The Iwasawa λ-invariants of Zp-extensions of real quadratic fields, Acta Arith., 69 (1995), 277-292. [FW] B. Ferrero and L. Washington, The Iwasawa invariant μp vanishes for abelian number fields, Ann. of Math., 109 (1979), 377-395. [G1] R. Greenberg, On the Iwasawa invariants of totally real number fields, Amer. J. Math., 98 (1976), 263-284. [G2] R. Greenberg, On p-adic L-functions and cyclotomic fields II, Nagoya Math. J., 67 (1977), 139-158. [IS1] H. Ichimura and H. Sumida, On the Iwasawa invariants of certain real abelian fields, Tohoku Math. J., 49 (1997), 203-215. [IS2] H. Ichimura and H. Sumida, On the Iwasawa invariants of certain real abelian fields II, Int. J. Math., 7 (1996), 721-744. [I1] K. Iwasawa, A note on class numbers of algebraic number fields, Abh. Math. Sem. Univ. Hamburg, 20 (1956), 257-258. [I2] K. Iwasawa, On Γ-extensions of algebraic number fields, Bull. Amer. Math. Soc., 65 (1959), 183-226. [I3] K. Iwasawa, Lectures on p-adic L-functions, Ann. of Math. Stud. no. 74, Princeton Univ. Press, Princeton, N. J. (1972). [I4] K. Iwasawa, On Zl-extensions of algebraic number fields, Ann. of Math., 98 (1973), 246-326. [Ku] M. Kurihara, The Iwasawa λ invariants of real abelian fields and the cyclotomic elements, preprint. [Kr] J. S. Kraft, Iwasawa invariants of CM fields, J. Number Theory, 32 (1989), 65-77. [KS] J. S. Kraft and R. Schoof, Computing Iwasawa modules of real quadratic number fields, Compositio Math., 97 (1995), 135-155. [OT] M. Ozaki and H. Taya, A note on Greenberg's conjecture of real abelian number fields, Manuscripta Math., 88 (1995), 311-320. [MW] B. Mazur and A. Wiles, Class fields of abelian extensions of Q, Invent. Math., 76 (1984), 179-330. [T] H. Taya, On the Iwasawa λ-invariants of real quadratic fields, Tokyo J. Math., 16 (1993), 121-130. [W] L. Washington, Introduction to Cyclotomic Fields, Graduate Texts in Math., no. 83, Springer, New York (1982).
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