205 research outputs found
Subharmonic Almost Periodic Functions of Slow Growth
We obtain a complete description of the Riesz measures of almost periodic
subharmonic functions with at most of linear growth on the complex plane; as a
consequence we get a complete description of zero sets for the class of entire
functions of exponential type with almost periodic modulus
Perturbations of discrete lattices and almost periodic sets
A discrete set in the -dimensional Euclidian space is {\it almost
periodic}, if the measure with the unite masses at points of the set is almost
periodic in the weak sense. We propose to construct positive almost periodic
discrete sets as an almost periodic perturbation of a full rank discrete
lattice. Also we prove that each almost periodic discrete set on the real axes
is an almost periodic perturbation of some arithmetic progression.
Next, we consider signed almost periodic discrete sets, i.e., when the signed
measure with masses at points of a discrete set is almost periodic. We
construct a signed discrete set that is not almost periodic, while the
corresponding signed measure is almost periodic in the sense of distributions.
Also, we construct a signed almost periodic discrete set such that the measure
with masses +1 at all points of the set is not almost periodic.Comment: 6 page
On critical points of Blaschke products
We obtain an upper bound for the derivative of a Blaschke product, whose
zeros lie in a certain Stolz-type region. We show that the derivative belongs
to the space of analytic functions in the unit disk, introduced recently in
\cite{FG}. As an outcome, we obtain a Blaschke-type condition for critical
points of such Blaschke products.Comment: 6 pages in LaTe
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