Algebraic results for certain values of the Jacobi theta-constant θ3(τ)
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Carsten Elsner [1] ; Yohei Tachiya [2]
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[1] University of Applied Sciences
University of Applied Sciences
Region Hannover, Alemania
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[2] Hirosaki University
Hirosaki University
Japón
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- Localización: Mathematica scandinavica, ISSN 0025-5521, Vol. 123, Nº 2, 2018, págs. 249-272
- Idioma: inglés
- DOI: 10.7146/math.scand.a-105465
- Texto completo no disponible (Saber más ...)
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Resumen
In its most elaborate form, the Jacobi theta function is defined for two complex variables z and τ by θ(z|τ)=∑∞ν=−∞eπiν2τ+2πiνz, which converges for all complex number z, and τ in the upper half-plane. The special case θ3(τ):=θ(0|τ)=1+2∑ν=1∞eπiν2τ is called a Jacobi theta-constant or Thetanullwert of the Jacobi theta function θ(z|τ). In this paper, we prove the algebraic independence results for the values of the Jacobi theta-constant θ3(τ). For example, the three values θ3(τ), θ3(nτ), and Dθ3(τ) are algebraically independent over Q for any τ such that q=eπiτ is an algebraic number, where n≥2 is an integer and D:=(πi)−1d/dτ is a differential operator. This generalizes a result of the first author, who proved the algebraic independence of the two values θ3(τ) and θ3(2mτ) for m≥1. As an application of our main theorem, the algebraic dependence over Q of the three values θ3(ℓτ), θ3(mτ), and θ3(nτ) for integers ℓ,m,n≥1 is also presented.
