Taylor Coefficients and Mean Growth of the Derivative of Qp Functions

Let f and h be transcendental meromorphic and g a transcendental entire function. It is shown that if h grows slower than g in a suitable sense, then there Ž . Ž Ž .. Ž . exists an unbounded sequence z such that f g z s h z . ᮊ 2001 Academic n n n Press 1 Supported by Deutscher Akademischer Austausc

## Improved Bounds for Taylor Coefficients of Analytic Functions The practical computation of verified bounds for Taylor coefficients of analytic functions is considered. Using interval arithmetic, the bounds are constructed from Cauchy's estimate and from some of its modifications. By employing t

## Abstract If __ϕ__ is a positive function defined in [0, 1) and 0 < __p__ < ∞, we consider the space ℒ︁(__p__, __ϕ__) which consists of all functions __f__ analytic in the unit disc 𝔻 for which the integral means of the derivative __M__ ~__p__~ (__r__, __f__ ′) = $ \left ({\textstyle {{1} \over {

In this paper we shall analyze the Taylor coefficients of entire functions integrable against dµp(z) = p 2π e -|z| p |z| p-2 dσ(z) where dσ stands for the Lebesgue measure on the plane and p ∈ IN, as well as the Taylor coefficients of entire functions in some weighted sup -norm spaces.