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$$p$$-adic monodromy and the Birch and Swinnerton-Dyer conjecture. A workshop held August 12-16, 1991 in Boston, MA, USA. (English) Zbl 0794.00016
Contemporary Mathematics. 165. Providence, RI: American Mathematical Society (AMS). xiii, 315 p. (1994).
The articles of this volume will be reviewed individually.
Indexed articles:
Mazur, B., On monodromy invariants occurring in global arithmetic, and Fontaine’s theory, 1-20 [Zbl 0846.11039]
Coleman, Robert F., A $$p$$-adic Shimura isomorphism and $$p$$-adic periods of modular forms, 21-51 [Zbl 0838.11033]
Coleman, Robert; Teitelbaum, Jeremy, Numerical solution of the $$p$$-adic hypergeometric equation, 53-62 [Zbl 0838.11037]
Jones, John W., Iwasawa $$L$$-functions and the mysterious $${\mathcal L}$$-invariant, 63-70 [Zbl 0823.11035]
Rubin, Karl, $$p$$-adic variants of the Birch and Swinnerton-Dyer conjecture for elliptic curves with complex multiplication, 71-80 [Zbl 0862.14014]
Kitagawa, Koji, On standard $$p$$-adic $$L$$-functions of families of elliptic cusp forms, 81-110 [Zbl 0841.11028]
Tan, Ki-Seng, $$p$$-adic pairings, 111-121 [Zbl 0840.14030]
Silverman, Joseph H., Variation of the canonical height in algebraic families, 123-133 [Zbl 0841.14021]
de Shalit, Ehud, Kronecker’s polynomial, supersingular elliptic curves, and $$p$$-adic periods of modular curves, 135-148 [Zbl 0863.14015]
Greenberg, Ralph, Trivial zeros of $$p$$-adic $$L$$-functions, 149-174 [Zbl 0838.11070]
Jordan, Bruce W., Higher weight modular forms and Galois representations, 175-181 [Zbl 0848.14010]
Greenberg, Ralph; Stevens, Glenn, On the conjecture of Mazur, Tate, and Teitelbaum, 183-211 [Zbl 0846.11030]
Carayol, Henri, Modular forms and Galois representations taking values in a complete local ring, 213-237 [Zbl 0812.11036]
Jochnowitz, Naomi, A $$p$$-adic conjecture about derivatives of $$L$$-series attached to modular forms, 239-263 [Zbl 0869.11040]
Darmon, Henri, Euler systems and refined conjectures of Birch Swinnerton-Dyer type, 265-276 [Zbl 0823.11036]
Klingenberg, Christoph, On $$p$$-adic $$L$$-functions of Mumford curves, 277-315 [Zbl 0863.14014]
##### MSC:
 00B25 Proceedings of conferences of miscellaneous specific interest 11-06 Proceedings, conferences, collections, etc. pertaining to number theory 14-06 Proceedings, conferences, collections, etc. pertaining to algebraic geometry
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