Entire Functions of Finite Order and Lines of Julia.
Entire functions of order , with bounds on both axes.
Entire functions that share a function with their first and second derivatives
Applying the normal family theory and the theory of complex differential equations, we obtain a uniqueness theorem for entire functions that share a function with their first and second derivative, which generalizes several related results of G. Jank, E. Mues & L. Volkmann (1986), C. M. Chang & M. L. Fang (2002) and I. Lahiri & G. K. Ghosh (2009).
Entire functions that share fixed-points.
Entire functions that share values or small functions with their derivatives
We investigate the uniqueness of entire functions sharing values or small functions with their derivatives. One of our results gives a necessary condition on the Nevanlinna deficiency of the entire function f sharing one nonzero finite value CM with its derivative f'. Some applications of this result are provided. Finally, we prove some further results on small function sharing.
Entire functions that share values with their derivatives.
Entire functions with a given sequence of zeros and of regular behavior on the real axis. I.
Entire Functions with Asymptotic Functions.
Entire Functions with Maximum Deficiency Sum and their Means.
Entire solutions of q-difference equations and value distribution of q-difference polynomials
We investigate the existence and uniqueness of entire solutions of order zero of the nonlinear q-difference equation of the form fⁿ(z) + L(z) = p(z), where p(z) is a polynomial and L(z) is a linear differential-q-difference polynomial of f with small growth coefficients. We also study the zeros distribution of some special type of q-difference polynomials.
Entrelacement de co-Poisson
On connaît le lien intime qui existe entre les équations fonctionnelles des fonctions et les formules sommatoires dont le prototype est donné par celle de Poisson. Ce lien fait intervenir la transformation intégrale de Fourier et ses généralisations. Ici, nous réexaminons la signification harmonique (ainsi qu’hilbertienne et distributionnelle) des équations fonctionnelles ayant la forme la plus simple, à savoir, celle s’appliquant pour la fonction dzêta de Riemann et les séries de Dirichlet...
Entrire functions and their derivatives share two finite sets.
Entropie de l'image inverse d'une application
Entwicklung der Functionen einer complexen Variabeln nach Lamé'schen Functionen und nach Zugeordneten der Kugelfunctionen. (Mit einer lithogr. Tafel)
Equality cases for condenser capacity inequalities under symmetrization
It is well known that certain transformations decrease the capacity of a condenser. We prove equality statements for the condenser capacity inequalities under symmetrization and polarization without connectivity restrictions on the condenser and without regularity assumptions on the boundary of the condenser.
Équations diophantiennes polynomiales à hautes multiplicités
On montre comment écrire de grandes familles, avec de hautes multiplicités, de cas d’égalité pour l’inégalité de Stothers-Mason (si sont des polynômes premiers entre eux, le nombre exact de racines du produit dépasse de le plus grand des degrés des composantes . On développera pour cela des techniques polynomiales itératives inspirées des décompositions de Dunford-Schwartz et de fonctions de Belyi. Des exemples d’application avec les conjectures ou de M. Hall sont développés.
Equicontinuous classes of ring -homeomorphisms.
Equiconvergence of Some Complex Interpolatory Polynomials.
Equiconvergence of some simultaneous Hermite-Padé interpolants
Equivalence of the Apollonian and its inner metric.