\begin{thebibliography}{10} \bibitem{coates-lichtenbaum} J.~Coates and S.~Lichtenbaum. \newblock On {$l$}-adic zeta functions. \newblock {\em Ann. of Math. (2)}, 98:498--550, 1973. \bibitem{colmez} Pierre Colmez. \newblock R\'esidu en {$s=1$} des fonctions z\^eta {$p$}-adiques. \newblock {\em Invent. Math.}, 91(2):371--389, 1988. \bibitem{colmez-crelle} Pierre Colmez. \newblock Fonctions z\^eta {$p$}-adiques en {$s=0$}. \newblock {\em J. Reine Angew. Math.}, 467:89--107, 1995. \bibitem{dr} Pierre Deligne and Kenneth~A. Ribet. \newblock Values of abelian {$L$}-functions at negative integers over totally real fields. \newblock {\em Invent. Math.}, 59(3):227--286, 1980. \bibitem{fg} Bruce Ferrero and Ralph Greenberg. \newblock On the behavior of {$p$}-adic {$L$}-functions at {$s=0$}. \newblock {\em Invent. Math.}, 50(1):91--102, 1978/79. \bibitem{greenberg-artin} Ralph Greenberg. \newblock On {$p$}-adic {A}rtin {$L$}-functions. \newblock {\em Nagoya Math. J.}, 89:77--87, 1983. \bibitem{greenberg-bu} Ralph Greenberg. \newblock Trivial zeros of {$p$}-adic {$L$}-functions. \newblock In {\em {$p$}-adic monodromy and the {B}irch and {S}winnerton-{D}yer conjecture ({B}oston, {MA}, 1991)}, volume 165 of {\em Contemp. Math.}, pages 149--174. Amer. Math. Soc., Providence, RI, 1994. \bibitem{greenberg-park} Ralph Greenberg. \newblock Introduction to {I}wasawa theory for elliptic curves. \newblock In {\em Arithmetic algebraic geometry ({P}ark {C}ity, {UT}, 1999)}, volume~9 of {\em IAS/Park City Math. Ser.}, pages 407--464. Amer. Math. Soc., Providence, RI, 2001. \bibitem{gross} Benedict~H. Gross. \newblock {$p$}-adic {$L$}-series at {$s=0$}. \newblock {\em J. Fac. Sci. Univ. Tokyo Sect. IA Math.}, 28(3):979--994 (1982), 1981. \bibitem{katz-cm} Nicholas~M. Katz. \newblock {$p$}-adic {$L$}-functions for {CM} fields. \newblock {\em Invent. Math.}, 49(3):199--297, 1978. \bibitem{miyake} Toshitsune Miyake. \newblock {\em Modular forms}. \newblock Springer Monographs in Mathematics. Springer-Verlag, Berlin, english edition, 2006. \newblock Translated from the 1976 Japanese original by Yoshitaka Maeda. \bibitem{ribet} Kenneth~A. Ribet. \newblock A modular construction of unramified {$p$}-extensions of{$Q(\mu \sb{p})$}. \newblock {\em Invent. Math.}, 34(3):151--162, 1976. \bibitem{shim} Goro Shimura. \newblock The special values of the zeta functions associated with {H}ilbert modular forms. \newblock {\em Duke Math. J.}, 45(3):637--679, 1978. \bibitem{siegel} Carl~Ludwig Siegel. \newblock \"{U}ber die {F}ourierschen {K}oeffizienten von {M}odulformen. \newblock {\em Nachr. Akad. Wiss. G\"ottingen Math.-Phys. Kl. II}, 1970:15--56, 1970. \bibitem{tate-book} John Tate. \newblock {\em Les conjectures de {S}tark sur les fonctions {$L$} d'{A}rtin en {$s=0$}}, volume~47 of {\em Progress in Mathematics}. \newblock Birkh\"auser Boston Inc., Boston, MA, 1984. \newblock Lecture notes edited by Dominique Bernardi and Norbert Schappacher. \bibitem{wiles-reps} A.~Wiles. \newblock On {$p$}-adic representations for totally real fields. \newblock {\em Ann. of Math. (2)}, 123(3):407--456, 1986. \bibitem{wileslambda} A.~Wiles. \newblock On ordinary {$\lambda$}-adic representations associated to modular forms. \newblock {\em Invent. Math.}, 94(3):529--573, 1988. \bibitem{wiles} A.~Wiles. \newblock The {I}wasawa conjecture for totally real fields. \newblock {\em Ann. of Math. (2)}, 131(3):493--540, 1990. \end{thebibliography}