A hybrid triple system of order v and index A, denoted by HTS(v, λ), is a pair (X,B) where X is a v-set and B is a collection of cyclic triples and transitive triples on X, such that every ordered pair of X belongs to A triples of B. An overlarge set of disjoint HTS(v, λ), denoted by OLHTS(v, λ), is a collection {(Y/{y}, .Ai)}i, such that Y is a (v + 1)-set, each (Y/{y}, Ai) is an HTS(v, λ,) and all Ais form a partition of all cyclic triples and transitive triples on Y. In this paper, we shall discuss the existence problem of OLHTS(v, A) and give the following conclusion: there exists an OLHTS(v, λ) if and only if λ= 1, 2, 4, v = 0, 1 (rood 3) and v ≥ 4.
A family (X, B1),(X, B2),..., (X, Bq) of q STS(v)s is a λ-fold large set of STS(v) and denoted by LSTSλ(v) if every 3-subset of X is contained in exactly A STS(v)s of the collection. It is indecomposable and denoted by IDLSTSx(v) if there does not exist an LSTSx, (v) contained in the collection for any λ 〈 λ. In this paper, we show that for λ = 5, 6, there is an IDLSTSλ(v) for v ≡ 1 or 3 (rood 6) with the exception IDLSTS6(7).
