The full metamorphosis of λ-fold block designs with block size four into λ-fold kite systems

Let(X,B)be a λ-fold block design with block size 4. If a path of length two is removed from each block of B the resulting collection of kites K is a partial λ-fold kite system(X,K). If the deleted edges can be arranged into a collection of kites D,then(X,K ∪ D)is a λ-fold kite system [5]. Now for each block 6 ∈ B let {P₁(6),P ₂(b),P₃(b)} be a partition of b into paths of length two and define for each i = 1,2,3, sets K_i and D_i as follows: for each b ∈ B,put the kite b\P_i(b)in K_i and the two edges belonging to the path P_i(b)in D_i. If the edges in D_i can be arranged into a collection of kites D_i ^* then M_i =(X,K_i∪D_i ^*)is a λ-fold kite system,called the ith metamorphosis of(X,B). The full metamorphosis is the set of three metamorphoses {M ₁,M₂,M₃}. We give a complete solution of the following problem: for which n and A does there exist a λ-fold block design with block size 4 having a full metamorphosis into a λ-fold kite system?.