Davenport constant with weights

Abstract

For the cyclic group G=Z/nZ and any non-empty A∈Z. We define the Davenport constant of G with weight A, denoted by DA(n), to be the least natural number k such that for any sequence (x1, ..., xk) with xi∈ G, there exists a non-empty subsequence (xj1, ..., xjl) and a1, ..., al∈ A such that Σi=1l aixji = 0. Similarly, we define the constant EA(n) to be the least t∈N such that for all sequences (x1, >..., xt) with xi ∈ G, there exist indices j1, ..., jn∈N, 1≤ j1 <... < jn≤ t, and 1, >..., n∈ A with Σni=1 ixji = 0. In the present paper, we show that EA(n)=DA(n)+n-1. This solve the problem raised by Adhikari and Rath ar06, Adhikari and Chen ac08, Thangadurai th07 and Griffiths gr08.