In this paper, we investigate the existence of incomplete group divisible designs (IGDDs) with block size four, group-type (g, h) u and general index λ. The necessary conditions for the existence of such a design are that u ≥ 4, g ≥ 3h, λg(u 1) ≡ 0 (mod 3), λ(g h)(u 1) ≡ 0 (mod 3), and λu(u 1)(g 2 h 2 ) ≡ 0 (mod 12). These necessary conditions are shown to be sufficient for all λ≥ 2. The known existence result for λ = 1 is also improved.
A k-cycle system of order v with index A, denoted by CS(v, k, λ), is a collection A of k-cycles (blocks) of Kv such that each edge in Kv appears in exactly λ blocks of A. A large set of CS(v, k, λ)s is a partition of the set of all k-cycles of Kv into CS(v, k, λ)s, and is denoted by LCS(v, k, λ). A (v - 1)-cycle in K, is called almost Hamilton. The completion of the existence problem for LCS(v, v- 1,λ) depends only on one case: all v ≥ 4 for λ=2. In this paper, it is shown that there exists an LCS(v,v - 1,2) for all v ≡ 2 (mod 4), v ≥ 6.
