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Bose's method of differences applied to construct Bhaskar Rao designs

Journal Article


Abstract


  • In this paper we show that BIBD(v,b,r,k,λ), where v=pq or pq+1, when written in the notation of Bose's method of differences may often be used to find generalized Bhaskar Rao designs GBRD(p,b′,r′,k,λ;G) where G is a group of order q and vice versa. This gives many new GBRDs including a GBRD(9,5,5;Z5) and a GBRD(13,7,7;Z7).

Publication Date


  • 1998

Citation


  • Seberry, J. (1998). Bose's method of differences applied to construct Bhaskar Rao designs. Journal of Statistical Planning and Inference, 73(1-2), 215-224. doi:10.1016/s0378-3758(98)00063-9

Scopus Eid


  • 2-s2.0-0040165174

Web Of Science Accession Number


Start Page


  • 215

End Page


  • 224

Volume


  • 73

Issue


  • 1-2

Abstract


  • In this paper we show that BIBD(v,b,r,k,λ), where v=pq or pq+1, when written in the notation of Bose's method of differences may often be used to find generalized Bhaskar Rao designs GBRD(p,b′,r′,k,λ;G) where G is a group of order q and vice versa. This gives many new GBRDs including a GBRD(9,5,5;Z5) and a GBRD(13,7,7;Z7).

Publication Date


  • 1998

Citation


  • Seberry, J. (1998). Bose's method of differences applied to construct Bhaskar Rao designs. Journal of Statistical Planning and Inference, 73(1-2), 215-224. doi:10.1016/s0378-3758(98)00063-9

Scopus Eid


  • 2-s2.0-0040165174

Web Of Science Accession Number


Start Page


  • 215

End Page


  • 224

Volume


  • 73

Issue


  • 1-2