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ЖУРНАЛЫ // Symmetry, Integrability and Geometry: Methods and Applications // Архив

SIGMA, 2024, том 20, 026, 14 стр. (Mi sigma2028)

Resurgence in the Transition Region: The Incomplete Gamma Function

Gergő Nemes

Department of Physics, Tokyo Metropolitan University, 1-1 Minami-osawa, Hachioji-shi, Tokyo, 192-0397, Japan

Аннотация: We study the resurgence properties of the coefficients $C_n(\tau)$ appearing in the asymptotic expansion of the incomplete gamma function within the transition region. Our findings reveal that the asymptotic behaviour of $C_n(\tau)$ as $n\to +\infty$ depends on the parity of $n$. Both $C_{2n-1}(\tau)$ and $C_{2n}(\tau)$ exhibit behaviours characterised by a leading term accompanied by an inverse factorial series, where the coefficients are once again $C_{2k-1}(\tau)$ and $C_{2k}(\tau)$, respectively. Our derivation employs elementary tools and relies on the known resurgence properties of the asymptotic expansion of the gamma function and the uniform asymptotic expansion of the incomplete gamma function. To the best of our knowledge, prior to this paper, there has been no investigation in the existing literature regarding the resurgence properties of asymptotic expansions in transition regions.

Ключевые слова: asymptotic expansions, incomplete gamma function, resurgence, transition regions.

MSC: 34E05, 33B20

Поступила: 31 января 2024 г.; в окончательном варианте 24 марта 2024 г.; опубликована 31 марта 2024 г.

Язык публикации: английский

DOI: 10.3842/SIGMA.2024.026


ArXiv: 2401.16671


© МИАН, 2024