Two properties of the partial theta function

Abstract

For the partial theta function θ (q,z):=Σj=0∞qj(j+1)/2zj, q, z∈ C, |q|<1, we prove that its zero set is connected. This set is smooth at every point (q,z) such that z is a simple or double zero of θ (q,.). For q∈ (0,1), q→ 1- and a≥ eπ, there are o(1/(1-q)) and ( (a/eπ))/(1-q)+o(1/(1-q)) real zeros of θ (q,.) in the intervals [-eπ,0) and [-a,-e-π] respectively (and none in [0,∞)). For q∈ (-1,0), q→ -1+ and a≥ eπ /2, there are o(1/(1+q)) real zeros of θ (q,.) in the interval [-eπ /2,eπ /2] and ( (a/eπ /2)/2)/(1+q)+o(1/(1+q)) in each of the intervals [-a,-eπ /2] and [eπ /2,a].