Dual Trigonometrical Series

C. J. Tranter

doi:10.1017/S2040618500033876

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In a recent joint paper with J. C. Cooke [1], we have given a method of determining the coefficients an in the “dual” Fourier-Bessel series

where −1 ≤p≤, F(r) is specified and αn is a positive root of Jv(αnα) = 0. This method reduced the problem to the solution of an infinite set of algebraical equations and it was shown that, under certain circumstances, numerical values for the coefficients could be obtained fairly readily.

References

1.Cooke, J. C. and Tranter, C. J., Dual Fourier-Bessel series, Quart. J. Mech. Appl. Math., (in press).Google Scholar

2.Tranter, C. J., On some dual integral equations, Quart. J. of Math. (Oxford) (2), 2 (1951), 60–66.Google Scholar

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Crossref Citations

This article has been cited by the following publications. This list is generated based on data provided by Crossref.

Tranter, C. J. 1960. Some triple integral equations. Proceedings of the Glasgow Mathematical Association, Vol. 4, Issue. 4, p. 200.

Tranter, C. J. 1960. A further note on dual trigonometrical series. Proceedings of the Glasgow Mathematical Association, Vol. 4, Issue. 4, p. 198.

Collins, W. D. 1961. On some dual series equations and their application to electrostatic problems for spheroidal caps. Mathematical Proceedings of the Cambridge Philosophical Society, Vol. 57, Issue. 2, p. 367.

Williams, W. E. 1963. A class of integral equations. Mathematical Proceedings of the Cambridge Philosophical Society, Vol. 59, Issue. 3, p. 589.

Srivastav, R. P. 1963. XVI.—Dual Series Relations. III. Dual Relations Involving Trigonometric Series. Proceedings of the Royal Society of Edinburgh. Section A. Mathematical and Physical Sciences, Vol. 66, Issue. 3, p. 173.

Noble, B. 1963. Some dual series equations involving Jacobi polynomials. Mathematical Proceedings of the Cambridge Philosophical Society, Vol. 59, Issue. 2, p. 363.

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Srivastav, R. P. 1964. XXIII.— Dual Series Relations. V. A Generalized Schlömilch Series and the Uniqueness of the Solution of Dual Equations involving Trigonometric Series. Proceedings of the Royal Society of Edinburgh. Section A. Mathematical and Physical Sciences, Vol. 66, Issue. 4, p. 258.

Tranter, C. J. 1964. An improved method for dual trigonometrical series. Proceedings of the Glasgow Mathematical Association, Vol. 6, Issue. 3, p. 136.

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Kelman, Robert B. and Koper, Chester A. 1973. Least squares approximations for dual trigonometric series. Glasgow Mathematical Journal, Vol. 14, Issue. 2, p. 111.

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Travkin, Yu. I. 1977. Solutions of mixed elasticity theory problems in terms of dual trigonometric series. Soviet Applied Mechanics, Vol. 13, Issue. 6, p. 551.

Kelman, Robert B. Maheffy, Johnathan P. and Simpson, J.Timothy 1977. Algorithms for classic dual trigonometric equations. Computers & Mathematics with Applications, Vol. 3, Issue. 3, p. 203.

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