AbstractThe minimum number of rows in covering arrays (equivalently, surjective codes) and radius-covering arrays (equivalently, surjective codes with a radius) has been determined precisely only in special cases. In this paper, explicit constructions for numerous best known covering arrays (upper bounds) are found by a combination of combinatorial and computational methods. For radius-covering arrays, explicit constructions from covering codes are developed. Lower bounds are improved upon using connections to orthogonal arrays, partition matrices, and covering codes, and in specific cases by computation. Consequently for some parameter sets the minimum size of a covering array is determined precisely. For some of these, a complete classifi...
The multicovering radii of a code are natural generalizations of the covering radius in which the go...
Covering arrays are combinatorial structures which extend the notion of orthogonal arrays and have a...
Covering arrays generalize orthogonal arrays by requiring that t -tuples be covered, but not requiri...
The minimum number of rows in covering arrays (equivalently, surjective codes) and radius-covering a...
AbstractThe minimum number of rows in covering arrays (equivalently, surjective codes) and radius-co...
A covering array of size N, strength t, degree k, and order v is a k × N array on v symbols in which...
A covering array of size N, degree k, order v and strength t is a k × N array with entries from a se...
International audienceA covering array CA(N ; t, k, v) of strength t is an N × k array of symbols fr...
A covering array CA(N; t, k, v) of strength t is an N × k array of symbols from an alphabet of size ...
AbstractLet Kq(n,R) denote the minimal cardinality of a q-ary code of length n and covering radius R...
The purpose of this paper is to discuss some recent generalizations of the basic covering radius pro...
The covering radius of a code is the least r such that the set of balls of radius r around codewords...
Covering arrays for words of length (Formula presented.) over a (Formula presented.) -letter alphabe...
Abstract. We obtain restrictions on the structure of binary orthogonal arrays of strength 5 under th...
AbstractA q-ary t-covering array is an m×n matrix with entries from {0,1,…,q−1} with the property th...
The multicovering radii of a code are natural generalizations of the covering radius in which the go...
Covering arrays are combinatorial structures which extend the notion of orthogonal arrays and have a...
Covering arrays generalize orthogonal arrays by requiring that t -tuples be covered, but not requiri...
The minimum number of rows in covering arrays (equivalently, surjective codes) and radius-covering a...
AbstractThe minimum number of rows in covering arrays (equivalently, surjective codes) and radius-co...
A covering array of size N, strength t, degree k, and order v is a k × N array on v symbols in which...
A covering array of size N, degree k, order v and strength t is a k × N array with entries from a se...
International audienceA covering array CA(N ; t, k, v) of strength t is an N × k array of symbols fr...
A covering array CA(N; t, k, v) of strength t is an N × k array of symbols from an alphabet of size ...
AbstractLet Kq(n,R) denote the minimal cardinality of a q-ary code of length n and covering radius R...
The purpose of this paper is to discuss some recent generalizations of the basic covering radius pro...
The covering radius of a code is the least r such that the set of balls of radius r around codewords...
Covering arrays for words of length (Formula presented.) over a (Formula presented.) -letter alphabe...
Abstract. We obtain restrictions on the structure of binary orthogonal arrays of strength 5 under th...
AbstractA q-ary t-covering array is an m×n matrix with entries from {0,1,…,q−1} with the property th...
The multicovering radii of a code are natural generalizations of the covering radius in which the go...
Covering arrays are combinatorial structures which extend the notion of orthogonal arrays and have a...
Covering arrays generalize orthogonal arrays by requiring that t -tuples be covered, but not requiri...