J. Coates's Arithmetic Theory of Elliptic Curves: Lectures given at the PDF

By J. Coates

ISBN-10: 0203645375

ISBN-13: 9780203645376

This quantity includes the accelerated types of the lectures given through the authors on the C. I. M. E. educational convention held in Cetraro, Italy, from July 12 to 19, 1997. The papers amassed listed below are large surveys of the present examine within the mathematics of elliptic curves, and likewise include a number of new effects which can't be stumbled on somewhere else within the literature. due to readability and magnificence of exposition, and to the historical past fabric explicitly integrated within the textual content or quoted within the references, the amount is definitely suited for study scholars in addition to to senior mathematicians.

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Extra info for Arithmetic Theory of Elliptic Curves: Lectures given at the Session of the Centro Internazionale Matematico Estivo (C.I.M.E.) held in Cetaro, Italy, ... Mathematics / Fondazione C.I.M.E., Firenze)

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Then one can prove the following result. 7. With the above notation, we have I corankn(Sel~(F,),) I I F,/F is the cyclotomic Zp-extension, but make no assumptions on the reduction type for E at primes lying over p. The conjecture below follows from results of Kato and Rohrlich when F is abelian over $ and E is defined over $ and modular. 8. The Zp-corank of SelE(Fn), is bounded as n varies. If this is so, then the map SelE(Fn), + s e l E ( ~ , ) ~ *must have infinite cokernel when n is sufficiently large, provided that we assume that E has potentially supersingular reduction at v for at least one prime v of F lying over p.

Where $ : GF,, -+ Z; is a continuous homoAgain we let C = ($,/Z,)($), morphism, v is any prime of F lying over p. If 77 is a prime of F, lying over v, then (F,), is the cyclotomic Z,-extension of F,. 3, the Z,corank of H1((Fn),, C) differs from [(F,),, : Fv]by at most 1. Thus, if we let rv= Gal((F,)q/F,), then it follows that as n -+ oo corankzp(HI ((F,)~, ~ ) )= ~ pn[Fv f : Q,] + O(1). Iwasawa theory for elliptic curves Ralph Greenberg 68 The structure theory of A-modules then implies that H1((F,),, C) has corank equal to [F, : $,I as a Z,[[r,]]-module.

On the other hand, GK has pcohomological dimension 1 because of the hypothesis that Gal(K/F,) contains an infinite pro-p subgroup. ) Thus if C is a divisible, pprimary GK-module, then the exact sequence 0 + C[p] + C 4 C + 0 induces the cohomology exact se, + H ~ ( K C[p]). , The last group is zero and quence H1(K, C ) 4 H ~ ( K C) hence H1(K, C ) is divisible. Applying this to C = C,, we see that Im(XK) is divisible and so Im(nK) = 1 m ( X ~ ) . If F, denotes the cyclotomic Zp-extension of F , then every prime v of F lying over p is ramified in F,/F.

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Arithmetic Theory of Elliptic Curves: Lectures given at the Session of the Centro Internazionale Matematico Estivo (C.I.M.E.) held in Cetaro, Italy, ... Mathematics / Fondazione C.I.M.E., Firenze) by J. Coates


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