On Algebraic Conditions for the Non-Vanishing of Linear Forms in Jacobi Theta-Constants

Abstract

Elsner, Luca and Tachiya proved in 2019 that the values of the Jacobi-theta constants θ3(mτ) and θ3(nτ) are algebraically independent over Q for distinct integers m,n under some conditions on τ. On the other hand, in 2018 Elsner and Tachiya also proved that three values θ3(mτ),θ3(nτ) and θ3( τ) are algebraically dependent over Q. In this article we prove the non-vanishing of linear forms in θ3(mτ), θ3(nτ) and θ3( τ) under various conditions on m,n,, and τ. Among other things we prove that for odd and distinct positive integers m,n>3 the three numbers θ3(τ), θ3(mτ) and θ3(n τ) are linearly independent over Q when τ is an algebraic number of some degree greater or equal to 3. In some sense this fills the gap between the above-mentioned former results on theta constants. A theorem on the linear independence over C(τ) of the functions θ3(a1 τ),…,θ3(am τ) for distinct positive rational numbers a1, … am is also established.