On the zero set of the partial theta function

Abstract

We consider the partial theta function θ (q,x):=Σ j=0∞qj(j+1)/2xj, where q∈ (-1,0) (0,1) and either x∈ R or x∈ C. We prove that for x∈ R, in each of the two cases q∈ (-1,0) and q∈ (0,1), its zero set consists of countably-many smooth curves in the (q,x)-plane each of which (with the exception of one curve for q∈ (-1,0)) has a single point with a tangent line parallel to the x-axis. These points define double zeros of the function θ (q,.); their x-coordinates belong to the interval [-38.83… ,-e1.4=4.05… ) for q∈ (0,1) and to the interval (-13.29,23.65) for q∈ (-1,0). For q∈ (0,1), infinitely-many of the complex conjugate pairs of zeros to which the double zeros give rise cross the imaginary axis and then remain in the half-disk \ |x|<18, Re\,x>0\. For q∈ (-1,0), complex conjugate pairs do not cross the imaginary axis.