Subsequence Sums in Permutations

Abstract

A sequence of positive integers (a1,a2,…,ak) is called -additive if a1+a2+·s+ak= a1 or ak. In this paper, we prove that for all k≥3, if n is sufficiently large, then every permutation of \1,2,…,n\ has a 2-additive subsequence of length k. We also provide polynomial bounds for the smallest n such that every permutation of \1,2,…,n\ has a 2-additive subsequence of length k. When only monotone subsequences are considered, we show that 18 is the smallest n such that every permutation of \1,2,…,n\ has a monotone 2-additive subsequence of length three. Strong bounds are obtained for the minimum number of -additive subsequences of any length, as well as monotone 2-additive subsequences of length three. Using techniques in arithmetic Ramsey theory, we also show similar results for products and inverse sums.