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On the asymptotic expansion of certain functions defined by infinite series

Published online by Cambridge University Press:  26 February 2010

R. Shail
Affiliation:
Department of Mathematical and Computing Sciences, University of Surrey, Guildford, Surrey. GU2 5XH
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Abstract

In this paper the method of inner and outer sums [5], together with the computational power of computer symbolic manipulation, are used to extend to high order the asymptotic expansions in an appropriate limit of some infinite series arising in low Reynolds-number fluid mechanics. The enhanced applicability of the expansions is demonstrated, and the method is extended to treat alternating series.

Type
Research Article
Copyright
Copyright © University College London 1997

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References

1.Love, J. D.. J. Inst. Maths Applies., 24 (1979), 255257.CrossRefGoogle Scholar
2.Rawlins, A. D., IMA J. Appl. Maths., 34 (1985), 119120.CrossRefGoogle Scholar
3.Maude, A. D.. J. Appl. Phys., 12 (1961), 293.Google Scholar
4Brenner, H.. Chem. Engng. Set., 16 (1961), 242.CrossRefGoogle Scholar
5.Cox, R. G. and Brenner, H.. Chem. Engng. Sci., 22 (1967), 17531777.CrossRefGoogle Scholar
6.Hansford, R. E.. Mathematika, 17 (1970), 250254.CrossRefGoogle Scholar
7.Onishi, Y.. J. Fluid Mech. 144 (1984), 103121.CrossRefGoogle Scholar
8.Temme, N. M.. Special Functions (Wiley Interscience, 1996).CrossRefGoogle Scholar
9.Davis, A. M. J., O'Neill, M. E., Dorrepaal, J. M. and Ranger, K. B.. J. Fluid Mech., 77 (1976), 625644.CrossRefGoogle Scholar
10.Van Dyke, M.. Perturbation Methods in Fluid Mechanics, (Parabolic Press, 1975).Google Scholar
11.Bart, E.. Chem. Engng. Sci., 23 (1968), 193210.CrossRefGoogle Scholar