Add to ORKGLet A =(si) be an n-tuple of positive integers such that Esi = 2k. We give an algorithm which shows that there exists a p = (RA(n, k) - (k+1)) such that there is an orthogonal design of type (2ps1, 2ps2,..., 2psn) in order 2k+p. We evaluate the maximum of p over n-tuples A which add to 2k. Hence we deduce that for any n and k there is an integer q = max RA(n, k) - (k+1) such that for any n-tuple A there is an orthogonal design of type 2qA in order 2q+k
Orthogonal designs are a natural generalization of the Baumert-Hall arrays which have been used to c...
Infinite families of amicable orthogonal designs are constructed with (i) both of type (1, q) in ord...
Abstract Orthogonal designs and their special cases such as weighing matrices and Hadamard matrices ...
Orthogonal designs of special type have been extensively studied, and it is the existence of these s...
We give three new constructions for orthogonal designs using amicable orthogonal designs. These are ...
Given any l-tuple (s1, s2,..., sl) of positive integers, there is an integer N = N (s1, s2,..., sl) ...
v, 115 leaves ; 29 cmAn orthogonal design of order n and type (si,..., se), denoted OD(n; si,..., se...
In a recent manuscript « Some asymptotic results for orthogonal designs » Peter Eades showed that fo...
This is a short note showing the existence of all twovariable designs in order 80 except possibly (1...
Orthogonal designs are a natural generalization of the Baumert-Hall arrays which have been used to c...
Repeat designs are introduced and it is shown how they may be used to give very powerful constructio...
A weighing matrix W = W(n,k) of order n and weight k is a square (0,l,-l)-matrix satisfying WWt -kIn...
An orthogonal design of order n and type (s1, S2) on the commuting variables x1, X2 is a matrix of o...
Constructions are given for orthogonal designs in orders divisible by eight. These are then used to ...
Some improved upper and lower bounds are given for the excess of Hadamard matrices. The excess of or...
Orthogonal designs are a natural generalization of the Baumert-Hall arrays which have been used to c...
Infinite families of amicable orthogonal designs are constructed with (i) both of type (1, q) in ord...
Abstract Orthogonal designs and their special cases such as weighing matrices and Hadamard matrices ...
Orthogonal designs of special type have been extensively studied, and it is the existence of these s...
We give three new constructions for orthogonal designs using amicable orthogonal designs. These are ...
Given any l-tuple (s1, s2,..., sl) of positive integers, there is an integer N = N (s1, s2,..., sl) ...
v, 115 leaves ; 29 cmAn orthogonal design of order n and type (si,..., se), denoted OD(n; si,..., se...
In a recent manuscript « Some asymptotic results for orthogonal designs » Peter Eades showed that fo...
This is a short note showing the existence of all twovariable designs in order 80 except possibly (1...
Orthogonal designs are a natural generalization of the Baumert-Hall arrays which have been used to c...
Repeat designs are introduced and it is shown how they may be used to give very powerful constructio...
A weighing matrix W = W(n,k) of order n and weight k is a square (0,l,-l)-matrix satisfying WWt -kIn...
An orthogonal design of order n and type (s1, S2) on the commuting variables x1, X2 is a matrix of o...
Constructions are given for orthogonal designs in orders divisible by eight. These are then used to ...
Some improved upper and lower bounds are given for the excess of Hadamard matrices. The excess of or...
Orthogonal designs are a natural generalization of the Baumert-Hall arrays which have been used to c...
Infinite families of amicable orthogonal designs are constructed with (i) both of type (1, q) in ord...
Abstract Orthogonal designs and their special cases such as weighing matrices and Hadamard matrices ...