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An asymptotic formula for the zeros of the deformed exponential function

arXiv:1501.02700

Abstract

We study the asymptotic representation for the zeros of the deformed exponential function $\sum\nolimits_{n = 0}^\infty {\frac1{n!}{q^{n(n - 1)/2}{x^n}}} $, $q\in (0,1)$. Indeed, we obtain an asymptotic formula for these zeros: \[x_n=- nq^{1-n}(1 + g(q)n^{-2}+o(n^{-2})),n\ge1,\] where $g(q)=\sum\nolimits_{k = 1}^\infty {σ(k){q^k}}$ is the generating function of the sum-of-divisors function $σ(k)$. This improves earlier results by Langley and Liu. The proof of this formula is reduced to estimating the sum of an alternating series, where the Jacobi's triple product identity plays a key role.

10 pages. To appear in Journal of Mathematical Analysis and Applications