AbstractA k2m×n (0,1) matrix is called a binary orthogonal array of strength m if in any m columns of the matrix every one of the possible 2m ordered (0,1) m-tuples occurs in exactly k rows and no two rows are identical. In this paper, the enumeration of binary orthogonal arrays is studied, and a closed expression for the enumeration of binary orthogonal arrays of strength 1 is given using the inclusion–exclusion principle and the edge-induced subgraph
We specify an algorithm to enumerate a minimum complete set of combinatorially non-isomorphic orthog...
This paper describes the construction and enumeration of mixed orthogonal arrays (MOA) to produce op...
AbstractLet G be a graph and let c(x,y) denote the number of vertices in G adjacent to both of the v...
A new construction for orthogonal arrays of strength 3 is given. 1 Introduction An orthogonal array...
The problem of embedding an orthogonal array of strength 2 into a complete orthogonal array is discu...
A nested orthogonal array is an OA(M,k,s,g) which contains an OA(M,k,r,g) as a subarray. Here r<s...
AbstractAn m×n (0, 1) matrix (aij) is said to be a * matrix iff aij=1 implies ai′j′=1 for all (i′, j...
We generate all the Orthogonal Arrays (OAs) of a given size n and strength t as the union of a colle...
We generate all the Orthogonal Arrays (OAs) of a given size n and strength t as the union of a colle...
AbstractA nested orthogonal array is an OA(N,k,s,g) which contains an OA(M,k,r,g) as a subarray. Her...
Let x≥0 and n≥2 be integers. Suppose there exists an orthogonal array A(n, q, μ∗) of strength 2 in n...
AbstractLet T(n x N) be a matrix with elements from the set of s integers {0,1…, s −1} Then T is sai...
AbstractIt is shown that a signed orthogonal array SAt(v, k, λ) exists for all (v, k, λ, t), k ⩾ t a...
It is shown that a signed orthogonal array SA<SUB>t</SUB>(v, k, λ) exists for all (v, k, λ, t), k ≥ ...
AbstractAn n×m proper array is a two-dimensional rectangular array composed of directed cubes that o...
We specify an algorithm to enumerate a minimum complete set of combinatorially non-isomorphic orthog...
This paper describes the construction and enumeration of mixed orthogonal arrays (MOA) to produce op...
AbstractLet G be a graph and let c(x,y) denote the number of vertices in G adjacent to both of the v...
A new construction for orthogonal arrays of strength 3 is given. 1 Introduction An orthogonal array...
The problem of embedding an orthogonal array of strength 2 into a complete orthogonal array is discu...
A nested orthogonal array is an OA(M,k,s,g) which contains an OA(M,k,r,g) as a subarray. Here r<s...
AbstractAn m×n (0, 1) matrix (aij) is said to be a * matrix iff aij=1 implies ai′j′=1 for all (i′, j...
We generate all the Orthogonal Arrays (OAs) of a given size n and strength t as the union of a colle...
We generate all the Orthogonal Arrays (OAs) of a given size n and strength t as the union of a colle...
AbstractA nested orthogonal array is an OA(N,k,s,g) which contains an OA(M,k,r,g) as a subarray. Her...
Let x≥0 and n≥2 be integers. Suppose there exists an orthogonal array A(n, q, μ∗) of strength 2 in n...
AbstractLet T(n x N) be a matrix with elements from the set of s integers {0,1…, s −1} Then T is sai...
AbstractIt is shown that a signed orthogonal array SAt(v, k, λ) exists for all (v, k, λ, t), k ⩾ t a...
It is shown that a signed orthogonal array SA<SUB>t</SUB>(v, k, λ) exists for all (v, k, λ, t), k ≥ ...
AbstractAn n×m proper array is a two-dimensional rectangular array composed of directed cubes that o...
We specify an algorithm to enumerate a minimum complete set of combinatorially non-isomorphic orthog...
This paper describes the construction and enumeration of mixed orthogonal arrays (MOA) to produce op...
AbstractLet G be a graph and let c(x,y) denote the number of vertices in G adjacent to both of the v...