On a problem of A. Beurling

We characterize the interpolating sequences for the Bernstein space of entire functions of exponential type, in terms of a Beurling-type density condition and a Carleson-type separation condition. Our work extends a description previously given by Beurling in the case that the interpolating sequence

Asymptotic behaviour of the counting function of Beurling integers is deduced from Chebyshev upper bound and Mertens formula for Beurling primes. The proof based on some properties of corresponding zeta-function on the right of its abscissa of convergence.

Let V be a finite-dimensional vector space over a number field. In this paper we prove a limit formula for heights on the endomorphism ring of V, which can be considered as the analogue for both the Gelfand Beurling formula for the spectral radius on a Banach algebra and Tate's averaging procedure f

We apply the theory of martingale transforms to study the Beurling Ahlfors transform, S, in dimensions n 2. This operator reveals a rich structure through its representation as a martingale, and we obtain new results concerning the operator norm of S acting on the class of differential forms having

Let T denote the unit circle in the plane. For various simple sets Λ in the plane we shall study the question whether (T, Λ) is a Heisenberg uniqueness pair. For example, we shall consider the cases where Λ is a circle or a union of two straight lines. We shall also use a theorem of Beurling and Mal