Add to ORKGA lot of research is being done on the various properties of Partial Latin Squares, with emphasis being on determining their unique properties and structures. The aim of this paper, however, is to look at ways of constructing Partial Latin Squares that fulfill a given criteria. In particular, we examine a special class of Partial Latin Square first examined by Peter Adams and Trevor Pickett [1].
The set PLS(a, b; n) is the set of all partial latin squares of order n with a completed rows, b com...
AbstractThe classical definition of Latin squares is generalized by allowing multiple occurences of ...
Recently, balanced incomplete Latin square designs are introduced in the literature. We propose thre...
In recent times there has been some interest in studying partial latin squares which have no complet...
Semi-Latin squares are generalizations of Latin squares with more than one letter in each cell. Vari...
Semi-Latin squares are generalizations of Latin squares with more than one letter in each cell. Vari...
Not AvailableRecently, balanced incomplete Latin square designs are introduced in the literature. W...
Latin squares were first introduced and studied by the famous mathematician Leonhard Euler in the 17...
Previously the process of finding critical sets in Latin squares has been inside cumbersome by the c...
Symmetries of a partial Latin square are primarily determined by its auto-topism group. Analogously ...
summary:We review results for the embedding of orthogonal partial Latin squares in orthogonal Latin ...
A theory about Latin Squares following [1]. A Latin Square is a n×n table filled with integers from ...
AbstractIn this paper we consider the following problem: Given a partial n × n latin square P on sym...
Abstract. A classical question in combinatorics is the following: given a par-tial latin square P, w...
In this paper we consider the following problem: Given a partial n × n latin square P on symbols 1, ...
The set PLS(a, b; n) is the set of all partial latin squares of order n with a completed rows, b com...
AbstractThe classical definition of Latin squares is generalized by allowing multiple occurences of ...
Recently, balanced incomplete Latin square designs are introduced in the literature. We propose thre...
In recent times there has been some interest in studying partial latin squares which have no complet...
Semi-Latin squares are generalizations of Latin squares with more than one letter in each cell. Vari...
Semi-Latin squares are generalizations of Latin squares with more than one letter in each cell. Vari...
Not AvailableRecently, balanced incomplete Latin square designs are introduced in the literature. W...
Latin squares were first introduced and studied by the famous mathematician Leonhard Euler in the 17...
Previously the process of finding critical sets in Latin squares has been inside cumbersome by the c...
Symmetries of a partial Latin square are primarily determined by its auto-topism group. Analogously ...
summary:We review results for the embedding of orthogonal partial Latin squares in orthogonal Latin ...
A theory about Latin Squares following [1]. A Latin Square is a n×n table filled with integers from ...
AbstractIn this paper we consider the following problem: Given a partial n × n latin square P on sym...
Abstract. A classical question in combinatorics is the following: given a par-tial latin square P, w...
In this paper we consider the following problem: Given a partial n × n latin square P on symbols 1, ...
The set PLS(a, b; n) is the set of all partial latin squares of order n with a completed rows, b com...
AbstractThe classical definition of Latin squares is generalized by allowing multiple occurences of ...
Recently, balanced incomplete Latin square designs are introduced in the literature. We propose thre...