По вашему запросу найдено документов: 334887
Страница 10 из 33489
Multidimensional Boundary Analog of the Hartogs Theorem in Circular Domains on the boundary of a domain D Cn, n > 1, into this domain. We study a functions with the one
Unified poincaré and hardy inequalities with sharp constants for convex domainsLet Ω be an n-dimensional convex domain, and let v ∈ [0,1/2]. For all f ∈ H0 1(Ω) we prove
Punishing factors and Chua's conjecture plane ℂ. We are concerned with the set A(Ω, ∏) of functions f : Ω → ∏ holomorphic on Ω and we prove
A proof of the Livingston conjecture that f has a simple pole at the point p ∈ (0, 1) and an expansion . In particular, we consider functions
On the coefficients of concave univalent functions domain whose complement with respect to ℂ̄ is convex. We call these functions concave univalent functions
On implicit function theorems at abnormal points taking values in a specified convex cone K lying in a Banach space X. This equation is investigated in a
Multidimensional boundary analog of the hartogs theorem in circular domainsIn this paper we consider continuous functions given on the boundary of a domain $D$ of C^n, n>1
MULTIDIMENSIONAL BOUNDARY ANALOG OF THE HARTOGS THEOREM IN CIRCULAR DOMAINSIn this paper we consider continuous functions given on the boundary of a domain D of C^n, n>1
On Dirichlet-type problems for the Lavrentev-Bitsadze equation with Dirichlet data for the Lavrent’ev-Bitsadze equation in a mixed domain. A general mixed problem (according
A geometric description of domains whose Hardy constant is equal to 1/4© 2014 Russian Academy of Sciences (DoM), London Mathematical Society, Turpion Ltd. We give a
Страница 10 из 33489
Фасеты
Партнеры
Индексация
