Some analytic properties of the partial theta function

Abstract

We prove new properties of the zero set of Ramanujan's partial theta function θ (q,x):=Σ j=0∞qj(j+1)/2xj, q∈ (-1,0) (0,1), x∈ R. We show that for each q∈ (0,1), there exists a line Rex=-a, a≥ 5, such that all real zeros of θ(q,.) lie to its left and all complex zeros to its right. A similar property is proved for q∈ (-1,0). For q∈ (0,1), there are no real zeros ≥ -6. For q∈ (-1,0), there are no negative zeros ≥ -2.4 and no positive zeros ≤ 2.4, except the smallest one.