Complete Monotonicity of classical theta functions and applications

Abstract

We produce trigonometric expansions for Jacobi theta functions\\ θj(u,τ), j=1,2,3,4\ where τ=iπ t, t > 0. This permits us to prove that\ θj(u, t)θj(0, t), j=2,3,4 and θ1(u, t)π θ'1(0, t) as well as δθjδ uθj as functions of t are completely monotonic. We also interested in the quotients Sj(u,v,t) = θj(u/2,iπ t)θj(u/2,iπ t). For fixed u,v such that 0≤ u < v < 1 we prove that the functions (δδ tSj)Sj for j=1,4 as well as the functions -(δδ tSj)Sj for j=2,3 are completely monotonic for t ∈ ]0,∞[.\\ Key words and phrases : theta functions, elliptic functions, complete monotonicity.