On the general solution of the functional equationf (x + y f (x)) = f (x) f (y) P. Javor Research Papers Pages: 235 - 238
Remarks on the functional equationf (x + y − xy) + f (xy) = f (x) + f (y) Halina światak Research Papers Pages: 239 - 241
Über die Existenz und iterative Berechnung einer Lösung der Hammerstein'schen Gleichung Herbert Amann Research Papers Pages: 242 - 266
Über die Funktionalgleichungf (1 + x) + f (1 + f (x)) = 1 W. BenzS. Elliger Research Papers Pages: 267 - 274
Additive Inhaltsmasse im positiv gekrümmten Raum W. MaierA. Effenberger Short Communications Pages: 308 - 309
On asymptotically regular solutions of a linear functional equation R. R. CoifmanM. Kuczma Short Communications Pages: 309 - 310
Interpolation by analytic functions of bounded growth D. G. CantorD. L. HillikerE. G. Straus Short Communications Pages: 310 - 310
Über ein Funktionalgleichlungssystem der Informationstheorie Z. Daróczy Short Communications Pages: 311 - 311
The asymptotic value of a singular integral related to the cauchy—hermite interpolation formula J. H. Curtiss Short Communications Pages: 311 - 312
Additional simple quadratures in the complex plane Philip J. Davis Short Communications Pages: 312 - 312
Note on approximation by bounded analytic functions, problem α: General configurations J. L. Walsh Short Communications Pages: 312 - 312
On the general solution of the functional equationf(x+yf(x))=f(x)f(y) P. Javor Short Communications Pages: 313 - 313
Remarks on the functional equationf(x+y−xy)+f(xy)=f(x)+f(y) Halina Światak Short Communications Pages: 314 - 314
Über die Existenz und iterative Berechnung einer Lösung der Hammerstein'schen Gleichung Herbert Amann Short Communications Pages: 314 - 315
Über die Klassenzahl des Körpers\(P\left( {\sqrt { - p} } \right)\) mit einer Primzahlp = 1 mod.23mit einer Primzahlp = 1 mod.23 Helmut Hasse Short Communications Pages: 316 - 316
Über die Funktionalgleichungf(1+x)+f(1+f(x))=1 W. BenzS. Elliger Short Communications Pages: 316 - 317
Boundedness on a set of positive measure and the mean value property characterizes polynomials on a spaceV n M. A. McKiernan Short Communications Pages: 317 - 318
Collineations on quadrilaterals in projective planes J. F. Rigby Short Communications Pages: 318 - 320