A tripling construction for overlarge sets of KTS

An overlarge set of , denoted by , is a collection {(X?{x},B_x):x∈X}, where X is a (v+1)-set, each (X?{x},B_x) is a and {B_x:x∈X} forms a partition of all triples on X. In this paper, we give a tripling construction for overlarge sets of KTS. Our main result is that: If there exists an with a special property, then there exists an . It is obtained that there exists an for u=2²ⁿ⁻¹−1 or u=qⁿ, where prime power q≡7 (mod 12) and m≥0,n≥1.