Confluent hypergeometric functions AB Olde Daalhuis NIST Handbook of Mathematical Functions, FWJ Olver, DW Lozier, RF Boisvert …, 2010 | 154* | 2010 |
Stokes phenomenon and matched asymptotic expansions AB Olde Daalhuis, SJ Chapman, JR King, JR Ockendon, RH Tew SIAM Journal on Applied Mathematics 55 (6), 1469-1483, 1995 | 82 | 1995 |
NIST digital library of mathematical functions (2017) FWJ Olver, AB Olde Daalhuis, DW Lozier, BI Schneider, RF Boisvert, ... Online version available at https://dlmf. nist. gov, 2017 | 68 | 2017 |
Hyperasymptotic solutions of higher order linear differential equations with a singularity of rank one AB Olde Daalhuis Proceedings of the Royal Society of London A: Mathematical, Physical and …, 1998 | 66* | 1998 |
Generalized hypergeometric functions and Meijer G-function RA Askey, AB Olde Daalhuis NIST handbook of mathematical functions, 403-418, 2010 | 61 | 2010 |
Hyperasymptotic solutions of second-order linear differential equations I AB Olde Daalhuis, FWJ Olver Methods and Applications of Analysis 2 (2), 173-197, 1995 | 58 | 1995 |
On the higher–order Stokes phenomenon CJ Howls, PJ Langman, AB Olde Daalhuis Proceedings of the Royal Society of London A: Mathematical, Physical and …, 2004 | 55 | 2004 |
Asymptotic expansions for q-gamma, q-exponential, and q-Bessel functions AB Olde Daalhuis Journal of Mathematical Analysis and Applications 186 (3), 896-913, 1994 | 55 | 1994 |
Exponentially improved asymptotic solutions of ordinary differential equations. II. Irregular singularities of rank one AB Olde Daalhuis, FWJ Olver Proc. R. Soc. Lond. A 445 (1923), 39-56, 1994 | 46 | 1994 |
Uniform Airy-type expansions of integrals AB Olde Daalhuis, NM Temme SIAM Journal on Mathematical Analysis 25 (2), 304-321, 1994 | 46 | 1994 |
Hyperasymptotics for nonlinear ODEs II. The first Painlevé equation and a second-order Riccati equation AB Olde Daalhuis Proceedings of the Royal Society of London A: Mathematical, Physical and …, 2005 | 38* | 2005 |
Uniform asymptotic expansions for hypergeometric functions with large parameters IV S Farid Khwaja, AB Olde Daalhuis Analysis and Applications 12 (06), 667-710, 2014 | 37 | 2014 |
Hyperasymptotic expansions of confluent hypergeometric functions AB Olde Daalhuis IMA journal of applied mathematics 49 (3), 203-216, 1992 | 35 | 1992 |
Hyperterminants II AB Olde Daalhuis Journal of Computational and Applied Mathematics 89 (1), 87-95, 1998 | 34 | 1998 |
An asymptotic expansion for the normalizing constant of the Conway–Maxwell–Poisson distribution RE Gaunt, S Iyengar, AB Olde Daalhuis, B Simsek Annals of the Institute of Statistical Mathematics, 1-18, 2017 | 32 | 2017 |
Uniform asymptotic expansions for hypergeometric functions with large parameters. I AB Olde Daalhuis Anal. Appl.(Singap.) 1 (1), 111-120, 2003 | 32* | 2003 |
Hyperterminants I AB Olde Daalhuis Journal of Computational and Applied Mathematics 76 (1-2), 255-264, 1996 | 32* | 1996 |
NIST Digital Library of Mathematical Functions http://dlmf. nist. gov FWJ Olver, ABO Daalhuis, DW Lozier, BI Schneider, RF Boisvert, ... Release 1, 22, 2016 | 30 | 2016 |
On the asymptotics for late coefficients in uniform asymptotic expansions of integrals with coalescing saddles AB Olde Daalhuis Methods and Applications of Analysis 7 (4), 727-746, 2000 | 30 | 2000 |
Why is a shock not a caustic? The higher-order Stokes phenomenon and smoothed shock formation SJ Chapman, CJ Howls, JR King, AB Olde Daalhuis Nonlinearity 20 (10), 2425, 2007 | 29 | 2007 |