References
Cassou-Noguès, P.: Valeurs aux entiers négatifs des fonctions zêta et fonctions zêtap-adiques. Invent. math.51, 29–59 (1979)
Ferrero, B., Washington, L.: The Iwasawa invariant μ p vanishes for abelian number fields. Ann. of Math.109, 377–395 (1979)
Katz, N.:p-adicL-functions via moduli of elliptic curves. In: Proceedings A.M.S. Summer Institute of Alg. Geom. at Arcata, Calif., 1974
Katz, N.: Another look atp-adicL-functions for totally real fields. Math. Ann.255, 33–43 (1981)
Iwasawa, K.: Onp-adicL-functions, Ann. of Math.89, 198–205 (1969)
Iwasawa, K.: Lectures onp-adicL-functions, Ann. of Math. Studies 74. Princeton University Press 1972
Lang, S.: Cyclotomic fields. Berlin-Heidelberg-New York: Springer 1978
Lang, S.: Cyclotomic fields II. Berlin-Heidelberg-New York: Springer 1980
Mazur, B.: Analysep-adique. Secret Bourbaki redaction. 1973
Washington, L.: Introduction to Cyclotomic fields. Berlin-Heidelberg-New York: Springer 1982
Washington, L.: The non-p-part of the class number in a cyclotomicZ p -extension. Invent. Math.49, 87–97 (1978)
Lang, S.: Introduction to Modular Forms. Berlin-Heidelberg-New York: Springer 1976
Friedman, E.: Ideal class groups in basic\(Z_{p_1 } \times \ldots \times Z_{p_s }\)-extensions of abelian number fields. Invent. math.65, 425–440 (1982)
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I would like to thank the Institute for Advanced Study and the National Science Foundation for their support while this work was done
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Sinnott, W. On theμ-invariant of theΓ-transform of a rational function. Invent Math 75, 273–282 (1984). https://doi.org/10.1007/BF01388565
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DOI: https://doi.org/10.1007/BF01388565