Convexity of Quotients of Theta Functions
Abstract
For fixed u and v such that 0≤ u<v<1/2, the monotonicity of the quotients of Jacobi theta functions, namely, θj(u|iπ t)/θj(v|iπ t), j=1, 2, 3, 4, on 0<t<∞ has been established in the previous works of A.Yu. Solynin, K. Schiefermayr, and Solynin and the first author. In the present paper, we show that the quotients θ2(u|iπ t)/θ2(v|iπ t) and θ3(u|iπ t)/θ3(v|iπ t) are convex on 0<t<∞.
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