Majoration de la norme des facteurs d'un polynôme
Majoration de la norme des facteurs d'un polynôme : cas où toutes les racines du polynôme sont réelles
Majoration du nombre de zéros d’une somme polynomiale d’exponentielles -adiques
Majorations effectives
Majorization for certain classes of analytic functions.
Majorization for certain classes of meromorphic functions defined by integral operator
Here we investigate a majorization problem involving starlike meromorphic functions of complex order belonging to a certain subclass of meromorphic univalent functions defined by an integral operator introduced recently by Lashin.
Majorization problem for a subclass of -valently analytic functions defined by the Wright generalized hypergeometric function
Majorization problems for certain analytic functions.
Mapping properties for convolutions involving hypergeometric functions.
Mapping properties of a class of univalent functions with pre-assigned zero and pole
Mapping properties of Fatou components.
Mapping properties of log log g' (z)
Mapping properties of some classes of analytic functions under a general integral operator defined by the Hadamard product
Mappings of domains in and their metric tensors.
Mappings of finite distortion: Compactness.
Mappings of finite distortion: composition operator.
Mappings of finite distortion : discreteness and openness for quasi-light mappings
Mappings of finite distortion: formation of cusps.
In this paper we consider the extensions of quasiconformal mappings f: B → Ωs to the whole plane, when the domain Ωs is a domain with a cusp of degree s > 0 and thus not an quasidisc. While these mappings do not have quasiconformal extensions, they may have extensions that are homeomorphic mappings of finite distortion with an exponentially integrable distortion, but in such a case ∫2B exp(λK(x)) dx = ∞ for all λ > 1/s. Conversely, for a given s > 0 such a mapping is constructed...
Mappings of finite distortion: Global homeomorphism theorem.
Mappings of finite distortion: Removability of Cantor sets.