Approximating Properties of Entire Functions of Exponential Type

We obtain, for entire functions of exponential type, a complementary result and a generalization of a quadrature formula with nodes at the zeros of Bessel functions. Our formula contains a sequence of rational fractions whose properties are studied.

Applying the theory of generalized functions we obtain the Shannon sampling theorem for entire functions F z of exponential growth and give its error estimate which shows how much the error depends on the sampling size and bandwidth for given domain of the signal F z . As an application we obtain a

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.

Hayman has shown that if f is a transcendental entire function and n G 2, then f n f Ј assumes all values except possibly zero infinitely often. We extend his result in three directions by considering an entire algebroid function w, its monomial иии w , and by estimating the growth of the number of