Generalized Sequences for a Subfamily of Univalent Functions

Let g(x, n), with x ¥ R + , be a step function for each n. Assuming certain technical hypotheses, we give a constant a and function f such that ; . n=1 g(x, n) can be written in the form a+; 0 < r < x f(r), where the summation is extended over all points in (0, x) at which some g( • , n) is not cont

In this paper we obtain, by the method of subordination chains, a sufficient condition for the analyticity and the univalence of the functions defined by an integral operator. In particular cases, I find the well-known conditions for univalency established by Ruscheweyh [7], Ahlfors [1], Becker [2],

## Abstract Generalized poles of a generalized Nevanlinna function __Q__ ∈ 𝒩~__κ__~ (ℋ︁) are defined in terms of the operator representation of __Q__ . In this paper those generalized poles that are not of positive type and their degrees of non‐positivity are characterized analytically by means of

can be regarded as a natural extension of the result about omitted values \* Supported by the Research Council of Norway.

The classical theory of the Weierstrass transform is extended to a generalized function space which is the dual of a testing function space consisting of purely entire functions with certain growth conditions developed by Kenneth B. Howell. An inversion formula and characterizations for this transfo

Forty-eight representatives of 12 tribes attributed to the subfamily Pooideae s.l. of grasses (Monocots) have been studied by sequencing the more variable 3' end of the chloroplast ndhF gene. Six representatives from 5 different tribes of Poaceae (Oryzeae, Streptogyneae, Bambuseae, Arundineae, Phare