On coefficients and zeros of sections of power series

Abstract:

For a power series $f(z) = \sum {a_k}{z^k}$ let ${s_n}$ denote the maximum modulus of the zeros of the $n$th partial sum $\sum \nolimits _0^n {{a_k}} {z^k}$. Asymptotic bounds on the sequence $|{a_n}{|^{1/n}}{s_n}$ are obtained for both entire functions and functions with finite radii of convergence. These extend the previous results of J. D. Buckholtz and J. K. Shaw. Finally, conjectures regarding best possible asymptotic bounds are stated.