We examine the structure of Farey maps, which are a class of maps (graph embeddings on surfaces) that have received significant attention recently. We describe how they are related to each other through coverings and parallel products, and use these observations to find their complete spectra, recovering some known results. We then examine a similar class of maps defined by Hecke groups
AbstractWe present a Prym construction which associates abelian varieties to vertex-transitive stron...
AbstractA map is a cell decomposition of a closed surface; it is regular if its automorphism group a...
Preface Regular maps and hypermaps are cellular decompositions of closed sur-faces exhibiting the hi...
We examine the structure of Farey maps, a class of graph embeddings on surfaces that have received s...
Farey sequences of irreducible fractions between 0 and 1 can be related to graph constructions known...
AbstractFarey sequences of irreducible fractions between 0 and 1 can be related to graph constructio...
Singerman introduced to the theory of maps on surfaces an object that is a universal cover for any m...
AbstractThe classical approach to maps is by cell decomposition of a surface. A combinatorial map is...
AbstractRegular q-valent maps correspond to normal subgroups of the triangle group (2,q,∞). This gro...
The classical approach to maps, as surveyed by Coxeter and Moser in Generators and Relations for Dis...
The regular embeddings of complete bipartite graphs Kn, n in orientable surfaces are classified and ...
AbstractThe aim of this survey article is to draw the attention of the combinatorial community to re...
The universal triangular map is the Farey map M^3 as shown by David Singerman in1988. The orientatio...
AbstractThis paper describes the determination of all orientably-regular maps and hypermaps of genus...
AbstractWe use group theory to construct infinite families of maps on surfaces which are invariant u...
AbstractWe present a Prym construction which associates abelian varieties to vertex-transitive stron...
AbstractA map is a cell decomposition of a closed surface; it is regular if its automorphism group a...
Preface Regular maps and hypermaps are cellular decompositions of closed sur-faces exhibiting the hi...
We examine the structure of Farey maps, a class of graph embeddings on surfaces that have received s...
Farey sequences of irreducible fractions between 0 and 1 can be related to graph constructions known...
AbstractFarey sequences of irreducible fractions between 0 and 1 can be related to graph constructio...
Singerman introduced to the theory of maps on surfaces an object that is a universal cover for any m...
AbstractThe classical approach to maps is by cell decomposition of a surface. A combinatorial map is...
AbstractRegular q-valent maps correspond to normal subgroups of the triangle group (2,q,∞). This gro...
The classical approach to maps, as surveyed by Coxeter and Moser in Generators and Relations for Dis...
The regular embeddings of complete bipartite graphs Kn, n in orientable surfaces are classified and ...
AbstractThe aim of this survey article is to draw the attention of the combinatorial community to re...
The universal triangular map is the Farey map M^3 as shown by David Singerman in1988. The orientatio...
AbstractThis paper describes the determination of all orientably-regular maps and hypermaps of genus...
AbstractWe use group theory to construct infinite families of maps on surfaces which are invariant u...
AbstractWe present a Prym construction which associates abelian varieties to vertex-transitive stron...
AbstractA map is a cell decomposition of a closed surface; it is regular if its automorphism group a...
Preface Regular maps and hypermaps are cellular decompositions of closed sur-faces exhibiting the hi...