Hadamard matrices of order 36 and double-even self-dual [ 72 , 36 , 12 ] codes

@inproceedings{Bouyukliev2005HadamardMO,
  title={Hadamard matrices of order 36 and double-even self-dual [ 72 , 36 , 12 ] codes},
  author={Iliya Bouyukliev and Veerle Fack and Joost Winne},
  year={2005}
}
A balanced incomplete block design (BIBD) [1] with parameters 2-(v, b, r, k, λ) (short 2-(v, k, λ)) is a pair (V,B) where V is a v-set (elements are called points) and B is a collection of b k-subsets (elements are called blocks) of V such that each point is contained in exactly r blocks and any pair of points is contained in exactly λ blocks. A Hadamard matrix of order n is an n × n (1,−1)-matrix satisfying HH = nI . Each Hadamard matrix can be normalized, i.e. replaced by an equivalent… CONTINUE READING

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