2,080 research outputs found
The Maximal Rank Conjecture
Let C be a general curve of genus g, embedded in P^r via a general linear
series of degree d. In this paper, we prove the Maximal Rank Conjecture, which
determines the Hilbert function of C
On the Surjectivity of Galois Representations Associated to Elliptic Curves over Number Fields
Given an elliptic curve over a number field , the -torsion
points of define a Galois representation \gal(\bar{K}/K) \to
\gl_2(\ff_\ell). A famous theorem of Serre states that as long as has no
Complex Multiplication (CM), the map \gal(\bar{K}/K) \to \gl_2(\ff_\ell) is
surjective for all but finitely many .
We say that a prime number is exceptional (relative to the pair
) if this map is not surjective. Here we give a new bound on the largest
exceptional prime, as well as on the product of all exceptional primes of .
We show in particular that conditionally on the Generalized Riemann Hypothesis
(GRH), the largest exceptional prime of an elliptic curve without CM is no
larger than a constant (depending on ) times , where is the
absolute value of the norm of the conductor. This answers affirmatively a
question of Serre
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