Mean Values of Derivatives of Modular L-Series

“…A similar result for linear families, i.e. E u,v : l(u, v)y 2 = f (x) with l a linear form, has been proved by Goldfeld-Hoffstein-Patterson [4] for CM elliptic curves, and by Murty-Murty [11] and Bump-Friedberg-Hoffstein [2] for general elliptic curves. The situation in the present paper is much more delicate owing to the fact that the quadratic family is too sparse for any direct application of harmonic analysis.…”

“…Indeed using genus theory, as explained above, a square-free positive integer d is represented by a form in the genus of Q if any only if (10) is nonzero. We set (11) and note that it is a multiplicative function on the set of square-free integers.…”

“…To derive the last equality we used (11). The Dirichlet series D n (s) converges absolutely for σ > 1/3, and in the domain σ ≥ 1/2 it satisfies the bound |D n (s)| n φ(n) , where the implied constant depends only on q, D. Observe that the inner sum over n in (18) converges absolutely and uniformly in any given compact domain for s, away from the possible poles coming from the L-function (i.e.…”

On quadratic families of CM elliptic curves

“…A similar result for linear families, i.e. E u,v : l(u, v)y 2 = f (x) with l a linear form, has been proved by Goldfeld-Hoffstein-Patterson [4] for CM elliptic curves, and by Murty-Murty [11] and Bump-Friedberg-Hoffstein [2] for general elliptic curves. The situation in the present paper is much more delicate owing to the fact that the quadratic family is too sparse for any direct application of harmonic analysis.…”

“…Indeed using genus theory, as explained above, a square-free positive integer d is represented by a form in the genus of Q if any only if (10) is nonzero. We set (11) and note that it is a multiplicative function on the set of square-free integers.…”

“…To derive the last equality we used (11). The Dirichlet series D n (s) converges absolutely for σ > 1/3, and in the domain σ ≥ 1/2 it satisfies the bound |D n (s)| n φ(n) , where the implied constant depends only on q, D. Observe that the inner sum over n in (18) converges absolutely and uniformly in any given compact domain for s, away from the possible poles coming from the L-function (i.e.…”

On quadratic families of CM elliptic curves

“…By the results of Bump-Friedberg-Hoffstein-Murty-Murty-Waldspurger [4], [27], [37], there is an imaginary quadratic field M 0 where all bad primes of E split, and such that the quadratic twist of E by M 0 has analytic rank at most 1. By Kolyvagin's theorem [20], the parity conjecture holds for the twist, so it suffices to prove it for E=M 0 .…”

On the Birch-Swinnerton-Dyer quotients modulo squares

“…More precisely, assume that the order of vanishing of TOME 56 (2006), FASCICULE 3 L(φ, 1) is 0 or 1. In this case, it is possible to choose an extension K/F so that all primes dividing N are split in K and L K (φ, 1) = 0 (if L(φ, 1) = 0 the existence of such a field K follows from the work of Bump-FriedbergHoffstein [9] and Murty-Murty [37], while for L(φ, 1) = 0 this is a result of Waldspurger [48]). Then Kolyvagin's result on the rank of E(K) imply the BSD conjecture over Q.…”

On the Birch and Swinnerton-Dyer conjecture for modular elliptic curves over totally real fields