On the cardinality of general h-fold sumsets

Abstract

Let A=\a0,a1,…,ak-1\ be a set of k integers. For any integer h 1 and any ordered k-tuple of positive integers r=(r0,r1,…,rk-1), we define a general h-fold sumset, denoted by h(r)A, which is the set of all sums of h elements of A, where ai appearing in the sum can be repeated at most ri times for i=0,1,…,k-1. In this paper, we give the best lower bound for |h(r)A| in terms of r and h and determine the structure of the set A when |h(r)A| is minimal. This generalizes results of Nathanson, and recent results of Mistri and Pandey and also solves a problem of Mistri and Pandey.