A property of a partial theta function

Abstract

The series θ (q,x):=Σ j=0∞qj(j+1)/2xj converges for |q|<1 and defines a partial theta function. For any fixed q∈ (0,1) it has infinitely many negative zeros. It is known that for q taking one of the spectral values q1, q2, … (where 0.3092493386… =q1<q2<·s <1, j→ ∞qj=1) the function θ (q,.) has a double zero which is the rightmost of its real zeros (the rest of them being simple). For q≠ qj the partial theta function has no multiple real zeros. We prove that: 1) for q∈ (qj,qj+1] the function θ is a product of a degree 2j real polynomial without real roots and a function of the Laguerre-P\'olya class LP-I; 2) for q∈ C 0, |q|<1, θ (q,x)=Π i(1+x/xi), where -xi are the zeros of θ; 3) for any fixed q∈ C 0, |q|<1, the function θ has at most finitely-many multiple zeros; 4) for any q∈ (-1,0) the function θ is a product of a real polynomial without real zeros and a function of the Laguerre-P\'olya class LP. 5) for any fixed q∈ C 0, |q|<1, and for k sufficiently large, the function θ has a zero ζ k close to -q-k. These are all but finitely-many of the zeros of θ.