We give a necessary condition for the biembedding of two Latin squares in an orientable surface. As a consequence, it is shown that for n≥2, there is no biembedding of two Latin squares both lying in the same main class as the square obtained from the Cayley table of the Abelian 2-group
For each positive integer n >= 2, there is a well-known regular orientable Hamiltonian embedding of ...
We apply a recursive construction for biembeddings of Latin squares to produce a new infinite family...
AbstractAn incomplete double diagonal Latin square of order n can be double-diagonally embedded in a...
AbstractWe give a necessary condition for the biembedding of two Latin squares in an orientable surf...
We give a necessary condition for the biembedding of two Latin squares in an orientable surface. As ...
The parity vectors of two Latin squares of the same side n provide a necessary condition for the two...
A known construction for face 2-colourable triangular embeddings of complete regular tripartite grap...
summary:We consider two classes of latin squares that are prolongations of Cayley tables of finite a...
A certain recursive construction for biembeddings of Latin squares has played a substantial role in ...
Face 2-colourable triangular embeddings of complete tripartite graphs $K_{n,n,n}$ correspond to biem...
For each integer $n\ge 3$, $n\ne 4$, for each odd integer $m\ge 3$, and for any $\lambda\in \mathbb{...
This is a preprint of an article accepted for publication in The Glasgow Math-ematical Journal c©200...
summary:We review results for the embedding of orthogonal partial Latin squares in orthogonal Latin ...
We prove that, with the single exception of the 2-group C22, the Cayley table of each Abelian group ...
In this paper, it is shown that a latin square of order n with n ≥ 3 and n≠6 can be embedded in a la...
For each positive integer n >= 2, there is a well-known regular orientable Hamiltonian embedding of ...
We apply a recursive construction for biembeddings of Latin squares to produce a new infinite family...
AbstractAn incomplete double diagonal Latin square of order n can be double-diagonally embedded in a...
AbstractWe give a necessary condition for the biembedding of two Latin squares in an orientable surf...
We give a necessary condition for the biembedding of two Latin squares in an orientable surface. As ...
The parity vectors of two Latin squares of the same side n provide a necessary condition for the two...
A known construction for face 2-colourable triangular embeddings of complete regular tripartite grap...
summary:We consider two classes of latin squares that are prolongations of Cayley tables of finite a...
A certain recursive construction for biembeddings of Latin squares has played a substantial role in ...
Face 2-colourable triangular embeddings of complete tripartite graphs $K_{n,n,n}$ correspond to biem...
For each integer $n\ge 3$, $n\ne 4$, for each odd integer $m\ge 3$, and for any $\lambda\in \mathbb{...
This is a preprint of an article accepted for publication in The Glasgow Math-ematical Journal c©200...
summary:We review results for the embedding of orthogonal partial Latin squares in orthogonal Latin ...
We prove that, with the single exception of the 2-group C22, the Cayley table of each Abelian group ...
In this paper, it is shown that a latin square of order n with n ≥ 3 and n≠6 can be embedded in a la...
For each positive integer n >= 2, there is a well-known regular orientable Hamiltonian embedding of ...
We apply a recursive construction for biembeddings of Latin squares to produce a new infinite family...
AbstractAn incomplete double diagonal Latin square of order n can be double-diagonally embedded in a...
DOI
Add to ORKG