Harmonic Univalent Functions with Negative Coefficients

## Abstract Let __D__ denote the open unit disc and __f__ : __D__ → \documentclass{article} \usepackage{amssymb} \pagestyle{empty} \begin{document} $ \overline {\mathbb C} $ \end{document} be meromorphic and injective in __D__. We assume that __f__ is holomorphic at zero and has the expansion Espe

We investigate theta functions attached to quadratic forms over a number field K. We establish a functional equation by regarding the theta functions as specializations of symplectic theta functions. By applying a differential operator to the functional equation, we show how theta functions with har

The class S H consists of harmonic, univalent, and sense-preserving functions f in the open unit disk U = z z < 1 , such that f = h + ḡ, where h z = z + ∞ n=2 a n z n and g z = ∞ n=1 a -n z n . Let S 0 H , C H , and C 0 H denote the subclass of S H with a -1 = 0, the subclass of S H with f being a c

We introduce the subclass P P j, , ␣ , n of starlike functions with negative coefficients by using the differential operator D n which was considered by G. S ¸t.

Let T T n be the class of functions with negative coefficients which are analytic Ž . Ž . Ž . in the unit disk U U. For functions f z and f z belonging to T T n , generaliza-1 2 Ž . Ž . Ž .Ž . tions of the Hadamard product of f z and f z represented by f ^f p,q; z 1 2 1 2 are introduced. In the pres

The authors introduce and study three novel subclasses of analytic and p-valent functions with negative coefficients. In addition to finding a necessary and sufficient condition for a function to belong to each of these subclasses, a number of other potentially useful properties and characteristics