On Gordon's method of solving dual integral equations
Glasgow mathematical journal, Tome 6 (1964) no. 3, pp. 117-122

Voir la notice de l'article provenant de la source Cambridge University Press

1. Dual integral equations of the formwhere f(x) and g(x) are given and Ψ(x) is the unknown, have been increasingly studied in recent years; the first solutions were given for the case g(x) ≡ 0 by Titchmarsh [1] (for 0 < α < 2) and Busbridge [2] (for — 2 < α < 0). An interesting and much simpler method of solving the equations in the same case, g ≡ 0, was given by Gordon [3]. He also showed that the problem of solving the general equations (1) and (2) can be reduced to a problem in which g ≡ 0. He did not pursue this idea as far as finding and simplifying the solution of (1) and (2) but this has been done recently (see [4]) and Noble [5] used a similar idea in treating the case f ≡ 0.
Burlak, J. On Gordon's method of solving dual integral equations. Glasgow mathematical journal, Tome 6 (1964) no. 3, pp. 117-122. doi: 10.1017/S2040618500034869
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