太空 发表于 2025-3-30 09:31:27

http://reply.papertrans.cn/32/3159/315833/315833_51.png

萤火虫 发表于 2025-3-30 12:26:41

http://reply.papertrans.cn/32/3159/315833/315833_52.png

种植,培养 发表于 2025-3-30 18:40:57

http://reply.papertrans.cn/32/3159/315833/315833_53.png

Celiac-Plexus 发表于 2025-3-30 21:06:09

Curriculum and the Life Erratic .(.). is a cuspidal eta product of level . and weight . for every .|. and every (integral or half-integral) .>0, the half lines from the origin through the standard unit vectors belong to the interior of .. Therefore, the first octant {.=(..).∈ℝ.∣.≠0, ..≥0 for all .|.} belongs to the interior of ..

小教堂 发表于 2025-3-31 04:30:19

http://reply.papertrans.cn/32/3159/315833/315833_55.png

引起痛苦 发表于 2025-3-31 05:59:19

Liang See Tan,Keith Chiu Kian Tangeneralization both of Dirichlet’s .-series and of Dedekind’s zeta functions. While Dirichlet’s .-series are defined by characters on the rational integers, Hecke’s .-functions involve characters on the integral ideals of algebraic number fields. The values of these characters at principal ideals de

虚弱 发表于 2025-3-31 12:19:10

http://reply.papertrans.cn/32/3159/315833/315833_57.png

lymphedema 发表于 2025-3-31 15:12:01

https://doi.org/10.1057/9780230105744.2 we obtained series expansions for four of these functions. In a closing remark in Sect. 3.6 we explained that these expansions are simple theta series for the rational number field with Dirichlet characters. Now we derive similar expansions for the remaining two eta products

奖牌 发表于 2025-3-31 17:43:16

https://doi.org/10.1007/978-3-030-48822-2e’s pioneering research (Hecke in Lectures on Dirichlet Series, Modular Functions and Quadratic Forms, Vandenhoeck & Ruprecht, Göttingen, .), but merely since three of them are conjugate to Fricke groups: Besides the modular group .(1)=Γ. itself, we have . The Hecke group .(2) is also called the . s

Lacerate 发表于 2025-4-1 01:03:26

Spoken Transgression and the Courts,on-cuspidal. Here we have an illustration for Theorem 3.9 (3): The lattice points on the boundary of the simplex .(2,1) do not belong to .(3,1), and two of the interior lattice points in .(2,1) are on the boundary of .(3,1). At this point it becomes clear that .(.).(.) is the only holomorphic eta pr
页: 1 2 3 4 5 [6] 7
查看完整版本: Titlebook: Eta Products and Theta Series Identities; Günter Köhler Book 2011 Springer-Verlag Berlin Heidelberg 2011 11-02, 11F20, 11F27, 11R11.Eisens