2003
DOI: 10.4310/mrl.2003.v10.n5.a13
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Irreducibility of Hecke polynomials

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Cited by 12 publications
(15 citation statements)
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“…We begin with a lemma which has been recorded in various forms in [3], [4], and [1]. We give a proof here for completeness.…”
Section: Proof Of Theorem 14mentioning
confidence: 99%
“…We begin with a lemma which has been recorded in various forms in [3], [4], and [1]. We give a proof here for completeness.…”
Section: Proof Of Theorem 14mentioning
confidence: 99%
“…This extends Theorem 1 of [JO98] and Theorem 1.1 of [BM03]. Both theorems restrict to the case N = 1 and assume that there is a unique Galois orbit of newforms, i.e., a unique P, so that no localization is needed.…”
Section: Lemma 1 the Field F F Is Totally Real And Q(amentioning
confidence: 81%
“…The set of p such that a p ∈ Q also has density 1 4 . In the literature there are related but weaker results concerning Corollary 1, which are situated in the context of Maeda's conjecture, i.e., they concern the case of level 1 and assume that the space S k (1) of cusp forms of weight k and level 1 consists of a single Galois orbit of newforms (see, e.g., [JO98] and [BM03]). We now show how Corollary 1 extends the principal results of these two papers.…”
Section: Lemma 1 the Field F F Is Totally Real And Q(amentioning
confidence: 99%
“…Let k be a positive integer, and let l be a prime number. The Hecke polynomial of T Some progress has been made towards this conjecture; methods introduced in [4] prove that certain Hecke polynomials are irreducible and have full Galois group, and results such as those in [6], [2] and [1] show that if a certain T l is irreducible then other T r must be irreducible also.…”
Section: Introductionmentioning
confidence: 99%
“…In [7] and [2], the authors first show that certain of the T 1,1 2,k are irreducible and then using effective versions of the Chebotarev density theorem to show that a positive proportion of the T 1,1 l,k are irreducible, and in [1], plausible hypotheses on the non-vanishing of certain coefficients of modular forms are used to prove irreducibility of the Hecke polynomials (when the weight is 12, for instance, these hypotheses are exactly Lehmer's conjecture on the Ramanujan τ -function).…”
Section: Introductionmentioning
confidence: 99%