Add to ORKGA hypermap H is a cellular embedding of a 3-valent graph G into a closed surface which cells are 3-coloured (adjacent cells have different colours). The vertices of G are called flags of H and let us denote by F the set of flags. An automorphism of the underlying graph which extends to a colour preserving self-homeomorphism of the surface is called an automorphism of the hypermap. If the surface is orientable the automorphisms of H split into two classes, orientation preserving and orientation reversing automorphisms. It is not difficult to observe that |Aut(H) | ≤ |F | while for the group of orientation preserving automorphisms we have |Aut + (H) | ≤ |F|/2. A hypermap satisfying |Aut + (H) | = |F|/2 = |Aut(H)| will be called chiral. Hen...
This paper uses combinatorial group theory to help answer some long-standing questions about the gen...
AbstractThis paper describes the determination of all orientably-regular maps and hypermaps of genus...
We study incidence geometries that are thin and residually connected. These geometries generalise a...
An orientably regular hypermap is totally chiral if it and its mirror image have no non-trivial comm...
AbstractAn orientably regular hypermap is totally chiral if it and its mirror image have no non-triv...
1 Introduction A map is an embedding of a finite connected graph into a surface (a compact real 2- d...
Although the phenomenon of chirality appears in many investigations of maps and hypermaps, no detail...
The rank 3 concept of a hypermap has recently been generalized to a higher rank structure in which h...
summary:We prove that if the Walsh bipartite map $\mathcal {M}=\mathcal {W}(\mathcal {H})$ of a regu...
Abstract A geometric object is called reflexible or chiral as it is or is not isomorphic to its mirr...
We prove the existence of infinitely many orientably-regular but chiral maps of every given hyperbol...
Complete lists are given of all reflexible orientable regular maps of genus 2 to 15, all non-orienta...
It is conjectured that given positive integers l, m, n with l¡1 +m¡1 + n¡1 < 1 and an integer g ¸ 0,...
Abstract: Duality and chirality are examples of operations of order 2 on hyper-maps. James showed th...
AbstractDuality and chirality are examples of operations of order 2 on hypermaps. James showed that ...
This paper uses combinatorial group theory to help answer some long-standing questions about the gen...
AbstractThis paper describes the determination of all orientably-regular maps and hypermaps of genus...
We study incidence geometries that are thin and residually connected. These geometries generalise a...
An orientably regular hypermap is totally chiral if it and its mirror image have no non-trivial comm...
AbstractAn orientably regular hypermap is totally chiral if it and its mirror image have no non-triv...
1 Introduction A map is an embedding of a finite connected graph into a surface (a compact real 2- d...
Although the phenomenon of chirality appears in many investigations of maps and hypermaps, no detail...
The rank 3 concept of a hypermap has recently been generalized to a higher rank structure in which h...
summary:We prove that if the Walsh bipartite map $\mathcal {M}=\mathcal {W}(\mathcal {H})$ of a regu...
Abstract A geometric object is called reflexible or chiral as it is or is not isomorphic to its mirr...
We prove the existence of infinitely many orientably-regular but chiral maps of every given hyperbol...
Complete lists are given of all reflexible orientable regular maps of genus 2 to 15, all non-orienta...
It is conjectured that given positive integers l, m, n with l¡1 +m¡1 + n¡1 < 1 and an integer g ¸ 0,...
Abstract: Duality and chirality are examples of operations of order 2 on hyper-maps. James showed th...
AbstractDuality and chirality are examples of operations of order 2 on hypermaps. James showed that ...
This paper uses combinatorial group theory to help answer some long-standing questions about the gen...
AbstractThis paper describes the determination of all orientably-regular maps and hypermaps of genus...
We study incidence geometries that are thin and residually connected. These geometries generalise a...