Uniform bounds on locations of zeros of partial theta function
Abstract
We consider the partial theta function θ (q,z):=Σ j=0∞qj(j+1)/2zj, where (q,z)∈ C2, |q|<1. We show that for any 0<δ 0<δ <1, there exists n0∈ N such that for any q with δ 0≤ |q|≤ δ and for any n≥ n0 the function θ has exactly n zeros with modulus <|q|-n-1/2 counted with multiplicity.
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