On the Existence of Perfect Splitter Sets

Abstract

Given integers k1, k2 with 0 k1<k2, the determinations of all positive integers q for which there exists a perfect Splitter B[-k1, k2](q) set is a wide open question in general. In this paper, we obtain new necessary and sufficient conditions for an odd prime p such that there exists a nonsingular perfect B[-1,3](p) set. We also give some necessary conditions for the existence of purely singular perfect splitter sets. In particular, we determine all perfect B[-k1, k2](2n) sets for any positive integers k1,k2 with k1+k24. We also prove that there are infinitely many prime p such that there exists a perfect B[-1,3](p) set.