Abstract
A (v, k, 1)-BIBD D is said to be doubly resolvable if there exists a \(\frac{{\upsilon - 1}}{{k - 1}} \times \frac{{\upsilon - 1}}{{k - 1}}\) array A such that each cell of A is either empty or contains a block of D, each variety of D is contained in one cell of each row and column of A and every block of D is in some cell of A. In this paper, we investigate automorphisms of such arrays.
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References
L.J. Dickey and Ryoh Ruji-Hara, A geometrical construction for doubly resolvable (n2+n+1,1)-designs, Ars Combin. 8 (1979), 3–12.
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Fuji-Hara, R., Vanstone, S.A. (1980). On automorphisms of doubly resolvable designs. In: Robinson, R.W., Southern, G.W., Wallis, W.D. (eds) Combinatorial Mathematics VII. Lecture Notes in Mathematics, vol 829. Springer, Berlin, Heidelberg. https://doi.org/10.1007/BFb0088897
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DOI: https://doi.org/10.1007/BFb0088897
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