Fractional Integration and Dual Integral Equations
- 1 January 1962
- journal article
- Published by Canadian Mathematical Society in Canadian Journal of Mathematics
- Vol. 14, 685-693
- https://doi.org/10.4153/cjm-1962-058-6
Abstract
In the analysis of mixed boundary value problems by the use of Hankel transforms we often encounter pairs of dual integral equations which can be written in the symmetrical form (1.1) Equations of this type seem to have been formulated first by Weber in his paper (1) in which he derives (by inspection) the solution for the case in which α — β = ½, v = 0, F ≡ 1, G ≡ 0.The first direct solution of a pair of equations of this type was given by Beltrami (2) for the same values of α— β and v with G(p) ≡ 0 but with F(ρ) arbitrary.Keywords
This publication has 12 references indexed in Scilit:
- Certain Dual Integral EquationsJournal of Mathematics and Physics, 1958
- A SOLUTION OF TRANTER'S DUAL INTEGRAL EQUATIONS PROBLEMThe Quarterly Journal of Mechanics and Applied Mathematics, 1956
- ON SOME DUAL INTEGRAL EQUATIONSThe Quarterly Journal of Mathematics, 1955
- Dual Integral EquationsJournal of the London Mathematical Society, 1954
- A FURTHER NOTE ON DUAL INTEGRAL EQUATIONS AND AN APPLICATION TO THE DIFFRACTION OF ELECTROMAGNETIC WAVESThe Quarterly Journal of Mechanics and Applied Mathematics, 1954
- ON SOME DUAL INTEGRAL EQUATIONSThe Quarterly Journal of Mathematics, 1951
- ON SOME DUAL INTEGRAL EQUATIONS OCCURRING IN POTENTIAL PROBLEMS WITH AXIAL SYMMETRYThe Quarterly Journal of Mechanics and Applied Mathematics, 1950
- ON FRACTIONAL INTEGRATION AND ITS APPLICATION TO THE THEORY OF HANKEL TRANSFORMSThe Quarterly Journal of Mathematics, 1940
- SOME REMARKS ON HANKEL TRANSFORMSThe Quarterly Journal of Mathematics, 1940
- Dual Integral EquationsProceedings of the London Mathematical Society, 1938