论文信息 - Partial λ-Geometries and Generalized Hadamard Matrices Over Groups

Partial λ-Geometries and Generalized Hadamard Matrices Over Groups

Section 1 of this paper contains all the work which deals exclusively with generalizations of Hadamard matrices. The non-existence theorem proven here (Theorem 1.10) generalizes a theorem of Hall and Paige [15] on the non-existence of complete mappings in certain groups. In Sections 2 and 3, we consider the duals of (Hanani) transversal designs; these dual structures, which we call (s, r, µ)-nets, are a natural generalization of the much studied (Bruck) nets which in turn are equivalent to sets of mutually orthogonal Latin squares. An (s, r, µ)-net is a set of s 2 µ points together with r parallel classes of blocks. Each class consists of s blocks of equal cardinality. Two non-parallel blocks meet in precisely µ points. It has been proven that r is always less than or equal to (s 2 µ – l) / (s – 1).

D. A. Drake

[1] R. Plackett,et al. THE DESIGN OF OPTIMUM MULTIFACTORIAL EXPERIMENTS , 1946 .

[2] L. Paige,et al. Complete mappings of finite groups. , 1951 .

[3] R. C. Bose,et al. Orthogonal Arrays of Strength two and three , 1952 .

[4] W. S. Connor,et al. Combinatorial Properties of Group Divisible Incomplete Block Designs , 1952 .

[5] W. S. Connor. Some Relations among the Blocks of Symmetrical Group Divisible Designs , 1952 .

[6] R. C. Bose. Strongly regular graphs, partial geometries and partially balanced designs. , 1963 .

[7] A. Street,et al. Combinatorics: room squares, sum-free sets, Hadamard matrices , 1972 .

[8] H. Hanani. On Transversal Designs , 1975 .

[9] D. Jungnickel,et al. Klingenberg structures and partial designs I: Congruence relations and solutions , 1977 .

[10] David A. Drake,et al. Maximal sets of Latin squares and partial transversals , 1977 .

[11] D. Jungnickel,et al. Klingenberg structures and partial designs. II. Regularity and uniformity , 1978 .

[12] Peter J. Cameron,et al. Partial λ-Geometries of Small Nexus , 1980 .