Paley type partial difference sets in abelian groups

Abstract

Partial difference sets with parameters (v,k,λ,μ)=(v, (v-1)/2, (v-5)/4, (v-1)/4) are called Paley type partial difference sets. In this note we prove that if there exists a Paley type partial difference set in an abelian group G of an order not a prime power, then |G|=n4 or 9n4, where n>1 is an odd integer. In 2010, Polhill Polhill constructed Paley type partial difference sets in abelian groups with those orders. Thus, combining with the constructions of Polhill and the classical Paley construction using non-zero squares of a finite field, we completely answer the following question: "For which odd positive integer v > 1, can we find a Paley type partial difference set in an abelian group of order v?"