Bibliography 
Because of the diverse subjects which are now included under the 
generic title of “ Integral Equations’ ’ it has been thought that greater 
service can be rendered by dividing the following bibliography into 
topics, rather than by a chronological arrangement of titles. In a 
few cases where a paper includes the subject-matter listed under two 
separate headings, this paper has been included twice in the Bibliog- 
raphy. On account of the great scope of integral equations and the 
large number of memoirs which have been published since 1900, the 
author does not expect that this Bibliography is free from the error 
of omission. 
A. GENERAL WORKS 
1. Robert D’Adhemar. Exercises et legons d’ Analyse. Paris. Gauthier- 
Villars (1908), pp. 121-184. 
2. Robert D’Adhemar. L’equation de Fredholm et les problemes de 
Dirichlet at Neumann. Paris. Librairie A. Hermann (1909). 
3. Robert D’Adhemar. Legons sur les Principes de 1’ Analyse, vol. 1. 
Paris, Gauthier-Villars (1912), chaps. 9, 10, pp. 227-285. 
4. H. Bateman. Report on the History and present State of the Theory of 
of Integral Equations. Report to British Association for the Advance- 
ment of Science. Sheffield (1910), pp. 345-424. 
5. M. Bocher. An Introduction to the Study of Integral Equations. 
Cambridge Tracts, No. 10, (1909). University Press, Cambridge, 72 p. 
6. E. Goursat. Cours d’analyse mathematique, 2d ed., vol. 3. Paris, 
Gauthier-Villars (1915), chaps. 30, 31, 32, 33, pp. 323-544. 
7. H. Hahn. Bericht liber die Theorie der linearen Integralgleichungen. 
Jahresbericht der Deutschen Mathematiker-Vereinigung, vol. 20 (1911), 
pp. 69-117. 
8. H. B. Heywood and M. Frechet. L’equation de Fredholm et ses 
applications a la Physique Mathematique. Paris, Hermann and Fils 
(1912), 165 p. 
9. D. Hilbert. Grundziige einer allgemeinen Theorie der Linearen 
Integralgleichungen. Gott. Naehrichten, 6 Mitteilungen (1904-1910). 
Leipzig, Teubner (1912), 282 p. 
10. J. Horn. Einftihrung in die Theorie der partiellen Differentialgleichun- 
gen. Leipzig (1910), chaps. 5, 6, 7, pp. 188-332. 
11. A. Kneser. Die Integralgleichungen und ihre Andwendungen in der 
Mathematischen Physik, Braunschweig, Vierweg and Sohn (1911), 
1st ed.; (1922), 2d ed. 292 p. 
12. A. Korn. Uber freie und erzwugene Schwingungen. Eine Einfiihrung 
in die Theorie der linearen Integralgleichungen. Leipzig and Berlin. 
Teubner (1911), 136 p. 
( 28 ) 
