Sums and Products of Distinct Sets and Distinct Elements in C

Abstract

Let A and B be finite subsets of C such that |B|=C|A|. We show the following variant of the sum product phenomenon: If |AB|<α|A| and α |A|, then |kA+lB| |A|k|B|l. This is an application of a result of Evertse, Schlickewei, and Schmidt on linear equations with variables taking values in multiplicative groups of finite rank, in combination with an earlier theorem of Ruzsa about sumsets in Rd. As an application of the case A=B we give a lower bound on |A+|+|A×|, where A+ is the set of sums of distinct elements of A and A× is the set of products of distinct elements of A.