On the use of Hadamard expansions in hyperasymptotic evaluation of Laplace-type integrals. II: Complex variable
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Publication:596154
DOI10.1016/j.cam.2003.10.021zbMath1052.41017OpenAlexW4230049051MaRDI QIDQ596154
Publication date: 10 August 2004
Published in: Journal of Computational and Applied Mathematics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.cam.2003.10.021
Gamma, beta and polygamma functions (33B15) Asymptotic approximations, asymptotic expansions (steepest descent, etc.) (41A60) Bessel and Airy functions, cylinder functions, ({}_0F_1) (33C10)
Related Items (5)
On the use of Hadamard expansions in hyperasymptotic evaluation of Laplace-type integrals. IV: Poles ⋮ On the use of Hadamard expansions in hyperasymptotic evaluation of Laplace-type integrals. III: Clusters of saddle points ⋮ Olver's asymptotic method revisited; case I ⋮ The evaluation of Bessel functions via exp-arc integrals ⋮ Hadamard expansions for integrals with saddles coalescing with an endpoint
Cites Work
- On the use of Hadamard expansions in hyperasymptotic evaluation of Laplace-type integrals. I: Real variable
- Hyperasymptotics for integrals with finite endpoints
- On the use of Hadamard expansions in hyperasymptotic evaluation. II Complex variables
- On the use of Hadamard expansions in hyperasymptotic evaluation. I. Real variables
- Uniform asymptotic smoothing of Stokes’s discontinuities
- On the use of Hadamard expansions in hyperasymptotic evaluation: differential equations of hypergeometric type
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