Toy models for D. H. Lehmer's conjecture
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概要
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In 1947, Lehmer conjectured that the Ramanujan τ-function τ(m) never vanishes for all positive integers m, where τ(m) are the Fourier coefficients of the cusp form Δ24 of weight 12. Lehmer verified the conjecture in 1947 for m < 214928639999. In 1973, Serre verified up to m < 1015, and in 1999, Jordan and Kelly for m < 22689242781695999. The theory of spherical t-design, and in particular those which are the shells of Euclidean lattices, is closely related to the theory of modular forms, as first shown by Venkov in 1984. In particular, Ramanujans τ-function gives the coefficients of a weighted theta series of the E8-lattice. It is shown, by Venkov, de la Harpe, and Pache, that τ(m) = 0 is equivalent to the fact that the shell of norm 2m of the E8-lattice is an 8-design. So, Lehmers conjecture is reformulated in terms of spherical t-design. Lehmers conjecture is difficult to prove, and still remains open. In this paper, we consider toy models of Lehmers conjecture. Namely, we show that the m-th Fourier coefficient of the weighted theta series of the Z2-lattice and the A2-lattice does not vanish, when the shell of norm m of those lattices is not the empty set. In other words, the spherical 5 (resp. 7)-design does not exist among the shells in the Z2-lattice (resp. A2-lattice).
- 社団法人 日本数学会の論文
- 2010-07-01
著者
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Miezaki Tsuyoshi
Faculty Of Mathematics Kyushu University
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Miezaki Tsuyoshi
Graduate School Of Mathematics Kyushu University
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Bannai Eiichi
Faculty Of Mathematics Graduate School Kyushu University
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Miezaki Tsuyoshi
Division Of Mathematics Graduate School Of Information Sciences Tohoku University
関連論文
- ON THE ZEROS OF EISENSTEIN SERIES ASSOCIATED WITH $\Gamma_0^\ast(2)$, $\Gamma_0^\ast(3)$ AND SOME GROUPS(Algebraic combinatorics and the related areas of research)
- ON THE ZEROS OF HECKE-TYPE FABER POLYNOMIALS
- Toy models for D. H. Lehmer's conjecture
- On the zeros of Eisenstein series for $\Gamma_0^{*}(2)$ and $\Gamma_0^{*}(3)$