322 ON THE RECENT PROGRESS OF ANALYSIS. 



MINDING. Sur les Integrates de la forme 



f dx P Jp t 

 y-*- 9 &c. 



J C X 



C. x. 195. An addition to this memoir is found at p. 292 of 

 the same volume. 



Recherches sur la Sommation d'un certain nombre de Fonc- 

 tions Transcendantes, &c. C. xi. 373. These researches relate 

 to an extension of Abel's theorem. 



Propositiones qusedam de Integralibus Functionum Algebrai- 



carum unius variabilis e principiis Abelianis derivatse. C. xxm. 

 255. This memoir is mentioned by M. Hermite. 



POISSON. Rapport sur deux Memoires de M. J. Liouville, &c. C. x. 

 342. Y. supra, Liouville. 



Theoremes relatifs aux Integrates des Fonctions Algebriques. 



C. xn. 89. Y. R. p. 249. 



RAABE. Bemerkungen zum Principe der doppelten Substitution, 

 u. s. w. C. xv. 191. 



RAMUS. De Integralibus Differentialium Algebraicarum. C. xxiv. 

 69. Y. R. p. 249. 



RICHELOT. Note sur le Theoreme, &c. C. ix. 407. Y. supra, Mind- 

 ing. 



De Integralibus Abelianis Primi Ordinis Commentatio Pri- 



ma. C. xii. 181. Y. R. p. 309. 



De Transformatione Integralium Abelianorum Primi Ordinis 



Commentatio. C. xvi. 221 and 285. Y. R. p. 310. 



Ueber die Integration eines merkwiirdigen Systems Differ- 



ential-gleichungen. C. xxm. 354. These equations are those 

 known as the " Jacobische System." Y. R. p. 306. 



Einige neue Integral-gleichungen des Jacobischen Systems 

 Differential-gleichungen. C. xxv. 97. The results contained in 

 this paper are much more general than those of the preceding 

 one. Y. R. p. 309. 



Nova Theoremata de Functionum Abelianorum cuj usque ordi- 



nis Yaloribus, &c. C. xxix. 281. Y. R. p. 310. 



Ueber die auf wiederholten Transformationen beruhende 



Berechnung der ultra-elliptischen Transcendenten. Schumacher 

 Astr. Nach. xm. 361. [July, 1836]. Y. R. p. 311. 



ROBERTS. Sur une Representation Geometrique des Fonctions Ellip- 

 tiques de Premiere Espece. L. vm. 263. 



Sur une Representation Geometrique des Trois Fonctions 



Elliptiques. L. ix. 155. Mr Roberts's papers relate to curves 

 formed by the intersection of a cone of the second order with a 



