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• Regular_Hadamard_matrix abstract "In mathematics a regular Hadamard matrix is a Hadamard matrix whose row and column sums are all equal. While the order of a Hadamard matrix must be 1, 2, or a multiple of 4, regular Hadamard matrices carry the further restriction that the order be a perfect square. The excess, denoted E(H), of a Hadamard matrix H of order n is defined to be the sum of the entries of H. The excess satisfies the bound|E(H)| ≤ n3/2. A Hadamard matrix attains this bound if and only if it is regular. If n = 4u2 is the order of a regular Hadamard matrix, then the excess is ±8u3 and the row and column sums all equal ±2u. It follows that each row has 2u2 ± u positive entries and 2u2 ∓ u negative entries. The orthogonality of rows implies that any two distinct rows have exactly u2 ± u positive entries in common. If H is interpreted as the incidence matrix of a block design, with 1 representing incidence and −1 representing non-incidence, then H corresponds to a symmetric 2-(v,k,λ) design with parameters (4u2, 2u2 ± u, u2 ± u). A design with these parameters is called a Menon design.A number of methods for constructing regular Hadamard matrices are known, and some exhaustive computer searches have been done for regular Hadamard matrices with specified symmetry groups, but it is not known whether every even perfect square is the order of a regular Hadamard matrix. Bush-type Hadamard matrices are regular Hadamard matrices of a special form, and are connected with finite projective planes.Like Hadamard matrices more generally, regular Hadamard matrices are named after Jacques Hadamard. Menon designs are named after P Kesava Menon, and Bush-type Hadamard matrices are named after Kenneth A. Bush.".
• Regular_Hadamard_matrix wikiPageID "11338044".
• Regular_Hadamard_matrix wikiPageRevisionID "511172437".
• Regular_Hadamard_matrix hasPhotoCollection Regular_Hadamard_matrix.
• Regular_Hadamard_matrix subject Category:Matrices.
• Regular_Hadamard_matrix type Abstraction100002137.
• Regular_Hadamard_matrix type Arrangement107938773.
• Regular_Hadamard_matrix type Array107939382.
• Regular_Hadamard_matrix type Group100031264.
• Regular_Hadamard_matrix type Matrices.
• Regular_Hadamard_matrix type Matrix108267640.
• Regular_Hadamard_matrix comment "In mathematics a regular Hadamard matrix is a Hadamard matrix whose row and column sums are all equal. While the order of a Hadamard matrix must be 1, 2, or a multiple of 4, regular Hadamard matrices carry the further restriction that the order be a perfect square. The excess, denoted E(H), of a Hadamard matrix H of order n is defined to be the sum of the entries of H. The excess satisfies the bound|E(H)| ≤ n3/2. A Hadamard matrix attains this bound if and only if it is regular.".
• Regular_Hadamard_matrix label "Regular Hadamard matrix".
• Regular_Hadamard_matrix sameAs m.02r85g0.
• Regular_Hadamard_matrix sameAs Q7309581.
• Regular_Hadamard_matrix sameAs Q7309581.
• Regular_Hadamard_matrix sameAs Regular_Hadamard_matrix.
• Regular_Hadamard_matrix wasDerivedFrom Regular_Hadamard_matrix?oldid=511172437.
• Regular_Hadamard_matrix isPrimaryTopicOf Regular_Hadamard_matrix.