AbstractWe define several types of transformations on the class of complete sets of pairwise orthogonal Latin squares (POLS) of order n and describe their geometrical effects in the corresponding projective planes. We establish a set of necessary and sufficient conditions that a projective plane of order n should be (V, l)-transitive (in the case where V lies on l) in terms of the properties of a corresponding complete set of POLS. We apply these ideas to determine which plane is represented by a particular complete set of POLS of order nine due to Paige and Wexler and find an answer different from that which has been given in the literature
Two n×n Latin squares L1,L2 are said to be orthogonal if, for every ordered pair (x, y) of symbols, ...
AbstractBy generalizing the construction of complete sets of mutually orthogonal latin squares from ...
AbstractThe numbers of non-isomorphic Latin squares of order 8 under the action of various different...
AbstractWe define several types of transformations on the class of complete sets of pairwise orthogo...
AbstractAn affine plane of order 9 can be specified by an orthogonal array with 10 constraints and 9...
AbstractWe investigate the construction of sets of t latin squares of a given non-prime-power order ...
summary:A combinatorial characterization of finite projective planes using strongly canonical forms ...
It is proved that the existence of a set of $(n-3)$ Mutually Orthogonal Latin Squares (MOLS) of orde...
In the first part of this article we determine the exact number of different reduced complete sets o...
AbstractA Latin square of side n defines in a natural way a finite geometry on 3n points, with three...
In this paper, the complexi¯cation of a Latin square, a complexi¯ed set of pairwise orthogonal Latin...
A Latin square of order n is an n-by-n array of n symbols, which we take to be the integers 0 to n-1...
We construct pairs of orthogonal Latin Squares of order $n$ by means of suitable orthomorphisms of t...
AbstractThis paper shows how to construct a Latin square orthogonal to its transpose for every order...
AbstractMaximal sets of s mutually orthogonal Latin squares of order v are constructed for infinitel...
Two n×n Latin squares L1,L2 are said to be orthogonal if, for every ordered pair (x, y) of symbols, ...
AbstractBy generalizing the construction of complete sets of mutually orthogonal latin squares from ...
AbstractThe numbers of non-isomorphic Latin squares of order 8 under the action of various different...
AbstractWe define several types of transformations on the class of complete sets of pairwise orthogo...
AbstractAn affine plane of order 9 can be specified by an orthogonal array with 10 constraints and 9...
AbstractWe investigate the construction of sets of t latin squares of a given non-prime-power order ...
summary:A combinatorial characterization of finite projective planes using strongly canonical forms ...
It is proved that the existence of a set of $(n-3)$ Mutually Orthogonal Latin Squares (MOLS) of orde...
In the first part of this article we determine the exact number of different reduced complete sets o...
AbstractA Latin square of side n defines in a natural way a finite geometry on 3n points, with three...
In this paper, the complexi¯cation of a Latin square, a complexi¯ed set of pairwise orthogonal Latin...
A Latin square of order n is an n-by-n array of n symbols, which we take to be the integers 0 to n-1...
We construct pairs of orthogonal Latin Squares of order $n$ by means of suitable orthomorphisms of t...
AbstractThis paper shows how to construct a Latin square orthogonal to its transpose for every order...
AbstractMaximal sets of s mutually orthogonal Latin squares of order v are constructed for infinitel...
Two n×n Latin squares L1,L2 are said to be orthogonal if, for every ordered pair (x, y) of symbols, ...
AbstractBy generalizing the construction of complete sets of mutually orthogonal latin squares from ...
AbstractThe numbers of non-isomorphic Latin squares of order 8 under the action of various different...