Stabilization of the asymptotic expansions of the zeros of a partial theta function

Abstract

The bivariate series θ (q,x):=Σ j=0∞qj(j+1)/2xj defines a partial theta function. For fixed q (|q|<1), θ (q,.) is an entire function. We prove a property of stabilization of the coefficients of the Laurent series in q of the zeros of θ. These series are of the form -q-j+(-1)jqj(j-1)/2(1+Σ k=1∞gj,kqk). The coefficients of the stabilized series are expressed by the positive integers rk giving the number of partitions into parts of three different kinds. They satisfy the recurrence relation rk=Σ =1∞(-1) -1(2 +1)rk- ( +1)/2. Set (Hm,j)~:~(Σ k=0∞rkqk) (1-qj+1+q2j+3-·s +(-1)m-1q(m-1)j+m(m-1)/2)= Σ k=0∞rk;m,jqk. Then for k≤ (m+2j)(m+1)/2-1-j and j≥ (2m-1+8m2+1)/2 one has gj,k=rk;m,j.