AbstractThe classical definition of Latin squares is generalized by allowing multiple occurences of symbols in each row and each column. A perfect <k, l>-Latin square is an N X N array in which any row or column contains every distinct symbol and the symbol at position (i, j) appears exactly k times in the ith row and l times in the jth column, or vice versa. Existence of such squares and the notion of orthogonality for such squares are studied. Several algorithms for constructing such squares are presented
A Latin square of order n is an n × n array in which each row and column contains symbols from an n-...
AbstractThis paper is a continuation of a study on a new class of combinatorial structures called ge...
The research explores properties of generalized multi-latin squares and proposes ways to construct t...
AbstractThe classical definition of Latin squares is generalized by allowing multiple occurences of ...
A multi-latin square of order n and index k is an n×n array of multisets, each of cardinality k, suc...
A multi-latin square of order n and index k is an n×n array of multisets, each of cardinality k, suc...
A multi-latin square of order n and index k is an n×n array of multisets, each of cardinality k, suc...
A multi-latin square of order n and index k is an n×n array of multisets, each of cardinality k, suc...
AbstractIn this paper, a new concept, k-plex orthogonality of Latin squares, is introduced. It gener...
A Latin square is an n X n array filled with n different symbols each occurring only once in each ro...
A Latin square is a grid or matrix containing the same number of rows and columns (k, say). The cell...
Latin squares were first introduced and studied by the famous mathematician Leonhard Euler in the 17...
Abstract: A Latin square arrangement is an arrangement of s symbols in s rows and s columns, such th...
AbstractThis paper is a continuation of a study on a new class of combinatorial structures called ge...
AbstractLet L be a Latin square of order n with entries from {0, 1,…, n − 1}. In addition, L is said...
A Latin square of order n is an n × n array in which each row and column contains symbols from an n-...
AbstractThis paper is a continuation of a study on a new class of combinatorial structures called ge...
The research explores properties of generalized multi-latin squares and proposes ways to construct t...
AbstractThe classical definition of Latin squares is generalized by allowing multiple occurences of ...
A multi-latin square of order n and index k is an n×n array of multisets, each of cardinality k, suc...
A multi-latin square of order n and index k is an n×n array of multisets, each of cardinality k, suc...
A multi-latin square of order n and index k is an n×n array of multisets, each of cardinality k, suc...
A multi-latin square of order n and index k is an n×n array of multisets, each of cardinality k, suc...
AbstractIn this paper, a new concept, k-plex orthogonality of Latin squares, is introduced. It gener...
A Latin square is an n X n array filled with n different symbols each occurring only once in each ro...
A Latin square is a grid or matrix containing the same number of rows and columns (k, say). The cell...
Latin squares were first introduced and studied by the famous mathematician Leonhard Euler in the 17...
Abstract: A Latin square arrangement is an arrangement of s symbols in s rows and s columns, such th...
AbstractThis paper is a continuation of a study on a new class of combinatorial structures called ge...
AbstractLet L be a Latin square of order n with entries from {0, 1,…, n − 1}. In addition, L is said...
A Latin square of order n is an n × n array in which each row and column contains symbols from an n-...
AbstractThis paper is a continuation of a study on a new class of combinatorial structures called ge...
The research explores properties of generalized multi-latin squares and proposes ways to construct t...