On the location of the complex conjugate zeros of the partial theta function

Abstract

We prove that for any q∈ (0,1), all complex conjugate pairs of zeros of the partial theta function θ(q,x):=Σ j=0∞qj(j+1)/2xj with non-negative real part belong to the half-annulus \Re(x)≥ 0,~1<|x|<5\, where the outer radius cannot be replaced by a number smaller than eπ/2=4.810477382…, and that for q∈ (0,0.21/4=0.6687403050… ], θ(q,.) has no zeros with non-negative real part. The complex conjugate pairs of zeros with negative real part belong to the left open half-disk of radius 49.8 centered at the origin.