42 
Indiana University Studies 
XVI. Hadamard’s Theorem 
277. T. Boggio. Nouvelle demonstration du theoreme de M. Hadamard 
sur les determinants. Bull, des Sciences Math., vol. 35, 2d ser. (1911), 
pp. 113-116. 
278. M. Capolla. Sul teorema di Hadamard relativo al modulo maSsimo 
di un determinante. Giornale di Mat., vol. 50 (1912), pp. 355-359. 
279. E. Fischer. t)ber den Hadamardschen Determinantensatz. Arkiv d. 
Math. u. Phys., vol. 13 (1908), pp. 32-40. 
280. J. Hadamard. Resolution d’une question relative aux determinants. 
Bull, des Sciences Math., vol. 17 (1893), pp. 240-246. Also see Comptes 
Rendus, vol. 116 (1893), pp. 1500-1501. 
281. T. Hayashi. Demonstration elementaire du theoreme de M. Hadamard 
sur la valeur maximum du determinant. Giornale di Mat., vol. 48 
(1910), pp. 253-258. 
282. A. Molinari. Sul teorema di Hadamard. Atti dei Lincei, vol. 22 (2), 
(1913), pp. 11-12. 
283. W. Wirtinger. Sur le theoreme de M. Hadamard relatif aux determi- 
nants. Bull des Sciences Math., vol. 31, 2d ser. (1907), pp. 175-179. 
Translation in German in Monatshefte f. Math. u. Phys., vol. 18 (1907), 
pp. 158-160. 
XVII. Integral Equations as Limiting Processes 
284. R. D. Carmichael. Boundary Value and Expansion Problems: Formu- 
lation of Various Transcendental Problems. Amer. Journal of Math., 
vol. 43 (1921), pp. 232-270. 
285. R. D. Carmichael. Boundary Value and Expansion Problems: Algebraic 
Basis of the Theory. Amer. Journal of Math., vol. 43 (1921), pp. 69-101. 
286. H. T. Davis. The Euler Differential Equation of Infinite Order. Amer. 
Math. Monthly, vol. 32 (1925), pp. 223-233. 
287. T. Lalesco. Sur 1’ equation de Volterra. Journal de Math., vol. 4, 
6th ser. (1908), pp. 125-202. 
288. T. Lalesco. Die Theorie der linearen Integlalgleichungen von 
unendlicher Ordnung. Bulet. Soc. de Stiinte, Bucarest, vol. 19 (1910), 
pp. 319-330. 
289. T. Lalesco. Les Equations differentielles lineaires d’ordre infini et 
P equation de Fredholm. Atti dei Lincei, vol. 27 (1), (1918), pp. 432-434. 
290. J. Mollerup. La determination du systeme orthogonal complet d’un 
noyau donne les determinants infinis des M. R. von Koch. Bull, des 
sciences math., vol. 35, 2d ser. (1911), pp. 266-273. 
291. F. Schtirer. Eine gemeinsame Methode zur Behandlung gewisser 
Funktionalgleichungsprobleme. Leipziger Berichte, vol. 70 (1918), 
pp. 185-246. 
292. V. Volterra. Sopra una proprieta generale delle equazioni integrali ed 
integro-differenziali. Atti dei Lincei, vol. 20 (2), (1911), pp. 79-88. 
XVIII. Integral Equations in the Complex Domain 
293. G. Bertrand. Equations de Fredholm a integrates principales au sens 
de Cauchy. Comptes Rendus, vol. 172 (1921), pp. 1458-1461. 
