Cocyclic Generalised Hadamard Matrices and Central Relative Difference Sets |
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| Authors: | A A I Perera K J Horadam |
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| Institution: | (1) Department of Mathematics, Royal Melbourne Institute of Technology, Melbourne, VIC, 3001, Australia |
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| Abstract: | Cocyclic matrices have the form
![$$M = \psi (g,h)]_{g,h} \in G,$$](/content/H1R68R145524N71H/10623_2004_Article_181765_TeX2GIFIE1.gif)
where G is a finite group, C is a finite abelian group and  : G × G  C is a (two-dimensional) cocycle; that is, This expression of the cocycle equation for finite groups as a square matrix allows us to link group cohomology, divisible designs with regular automorphism groups and relative difference sets. Let G have order v and C have order w, with w|v. We show that the existence of a G-cocyclic generalised Hadamard matrix GH (w, v/w) with entries in C is equivalent to the existence of a relative ( v, w, v, v/w)-difference set in a central extension E of C by G relative to the central subgroup C and, consequently, is equivalent to the existence of a (square) divisible ( v, w, v, v/w)-design, class regular with respect to C, with a central extension E of C as regular group of automorphisms. This provides a new technique for the construction of semiregular relative difference sets and transversal designs, and generalises several known results. |
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| Keywords: | cocyclic matrix generalised Hadamard matrix group invariant generalised Hadamard matrix semiregular relative difference set transversal design |
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