Zero sums in restricted sequences

Abstract

A sequence =(x1,…,xm) of elements of n is called an A-weighted Davenport Z-sequence if there exists :=(a1,…,am)∈ (A\0\)mm such that Σi aixi=0. Here m=(0,…,0)∈nm. Similarly, the sequence is called an A-weighted Erdos Z-sequence if there exists :=(a1,…,am)∈ (A\0\)m\m\ with |Supp()|=n, such that Σi aixi=0, where Supp():=\i: ai 0\. A n-sequence is called k-restricted if no element of n appears more than k times in . In this paper, we study the problem of determining the least value of m for which a k-restricted n-sequence of length m is an A-weighted Davenport Z-sequence (resp. anA-weighted Erdos Z-sequence). We also consider the same problem for random n sequences, for certain very natural choices for the set A.