Some examples of well-behaved Beurling number systems

Abstract

We investigate the existence of well-behaved Beurling number systems, which are systems of Beurling generalized primes and integers which admit a power saving in the error term of both their prime and integer-counting function. Concretely, we search for so-called [α,β]-systems, where α and β are connected to the optimal power saving in the prime and integer-counting functions. It is known that every [α,β]-system satisfies \α,β\1/2. In this paper we show there are [α,β]-systems for each α ∈ [0,1) and β ∈ [1/2, 1). Assuming the Riemann hypothesis, we also construct certain families of [α,β]-systems with β<1/2.