Ramanujan-style congruences of local origin

Neil Dummigan; Daniel Fretwell

doi:10.1016/j.jnt.2014.04.008

Ramanujan-style congruences of local origin

Neil Dummigan^*, Daniel Fretwell

^*Corresponding author for this work

Research output: Contribution to journal › Article › peer-review

8 Citations (Scopus)

Abstract

We prove that if a prime ℓ>3 divides p^k-1, where p is prime, then there is a congruence modulo ℓ, like Ramanujan's mod 691 congruence, for the Hecke eigenvalues of some cusp form of weight k and level p. We relate ℓ to primes like 691 by viewing it as a divisor of a partial zeta value, and see how a construction of Ribet links the congruence with the Bloch-Kato conjecture (theorem in this case). This viewpoint allows us to give a new proof of a recent theorem of Billerey and Menares. We end with some examples, including where p=2 and ℓ is a Mersenne prime.

Original language	English
Pages (from-to)	248-261
Number of pages	14
Journal	Journal of Number Theory
Volume	143
Early online date	4 Jun 2014
DOIs	https://doi.org/10.1016/j.jnt.2014.04.008
Publication status	Published - Oct 2014
Externally published	Yes

Keywords

11F33
Congruences of modular forms

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title = "Ramanujan-style congruences of local origin",

abstract = "We prove that if a prime ℓ>3 divides pk-1, where p is prime, then there is a congruence modulo ℓ, like Ramanujan's mod 691 congruence, for the Hecke eigenvalues of some cusp form of weight k and level p. We relate ℓ to primes like 691 by viewing it as a divisor of a partial zeta value, and see how a construction of Ribet links the congruence with the Bloch-Kato conjecture (theorem in this case). This viewpoint allows us to give a new proof of a recent theorem of Billerey and Menares. We end with some examples, including where p=2 and ℓ is a Mersenne prime.",

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T1 - Ramanujan-style congruences of local origin

AU - Dummigan, Neil

AU - Fretwell, Daniel

PY - 2014/10

Y1 - 2014/10

N2 - We prove that if a prime ℓ>3 divides pk-1, where p is prime, then there is a congruence modulo ℓ, like Ramanujan's mod 691 congruence, for the Hecke eigenvalues of some cusp form of weight k and level p. We relate ℓ to primes like 691 by viewing it as a divisor of a partial zeta value, and see how a construction of Ribet links the congruence with the Bloch-Kato conjecture (theorem in this case). This viewpoint allows us to give a new proof of a recent theorem of Billerey and Menares. We end with some examples, including where p=2 and ℓ is a Mersenne prime.

AB - We prove that if a prime ℓ>3 divides pk-1, where p is prime, then there is a congruence modulo ℓ, like Ramanujan's mod 691 congruence, for the Hecke eigenvalues of some cusp form of weight k and level p. We relate ℓ to primes like 691 by viewing it as a divisor of a partial zeta value, and see how a construction of Ribet links the congruence with the Bloch-Kato conjecture (theorem in this case). This viewpoint allows us to give a new proof of a recent theorem of Billerey and Menares. We end with some examples, including where p=2 and ℓ is a Mersenne prime.

KW - 11F33

KW - Congruences of modular forms

U2 - 10.1016/j.jnt.2014.04.008

DO - 10.1016/j.jnt.2014.04.008

M3 - Article

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VL - 143

SP - 248

EP - 261

JO - Journal of Number Theory

JF - Journal of Number Theory

SN - 0022-314X

ER -

Ramanujan-style congruences of local origin

Abstract

Keywords

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