Union of Two Arithmetic Progressions with the Same Common Difference Is Not Sum-dominant

Abstract

Given a finite set A⊂eq N, define the sum set A+A = \ai+aj ai,aj∈ A\ and the difference set A-A = \ai-aj ai,aj∈ A\. The set A is said to be sum-dominant if |A+A|>|A-A|. We prove the following results. 1) The union of two arithmetic progressions (with the same common difference) is not sum-dominant. This result partially proves a conjecture proposed by the author in a previous paper; that is, the union of any two arbitrary arithmetic progressions is not sum-dominant. 2) Hegarty proved that a sum-dominant set must have at least 8 elements with computers' help. The author of the current paper provided a human-verifiable proof that a sum-dominant set must have at least 7 elements. A natural question is about the largest cardinality of sum-dominant subsets of an arithmetic progression. Fix n 16. Let N be the cardinality of the largest sum-dominant subset(s) of \0,1,…,n-1\ that contain(s) 0 and n-1. Then n-7 N n-4; that is, from an arithmetic progression of length n 16, we need to discard at least 4 and at most 7 elements (in a clever way) to have the largest sum-dominant set(s). 3) Let R∈ N have the property that for all r R, \1,2,…,r\ can be partitioned into 3 sum-dominant subsets, while \1,2,…,R-1\ cannot. Then 24 R 145. This result answers a question by the author et al. in another paper on whether we can find a stricter upper bound for R.