Linnik's large sieve and the L1 norm of exponential sums

Abstract

The method of proof of Balog and Ruzsa and the large sieve of Linnik are used to investigate the behaviour of the L1 norm of a wide class of exponential sums over the square-free integers and the primes. Further, a new proof of the lower bound due to Vaughan for the L1 norm of an exponential sum with the von Mangoldt function over the primes is furnished. Ramanujan's sum arises naturally in the proof, which also employs Linnik's large sieve.