Add to ORKGThe operation of switching a graph Gamma with respect to a subset X of the vertex set interchanges edges and non-edges between X and its complement, leaving the rest of the graph unchanged. This is an equivalence relation on the set of graphs on a given vertex set, so we can talk about the automorphism group of a switching class of graphs. It might be thought that switching classes with many automorphisms would have the property that all their graphs also have many automorphisms. But the main theorem of this paper shows a different picture: with finitely many exceptions, if a non-trivial switching class S has primitive automorphism group, then it contains a graph whose automorphism group is trivial. We also find all the exceptional switchin...
Let Gamma be a graph and let G be a subgroup of automorphisms of Gamma. Then G is said to be locally...
Given that a large graph admits a group of automorphisms isomorphic to the abstract group G, what is...
AbstractThis paper investigates the automorphism group of a connected and undirected G-symmetric gra...
AbstractA cohomological sufficient condition is found for a switching class of graphs to have a memb...
AbstractThe operation of switching a finite graph was introduced by Seidel, in the study of strongly...
We prove that, for a primitive permutation group G acting on a set X of size n, other than the alter...
We introduce notation and terminology to investigate conditions on a permutation group G sufficient ...
AbstractFor a finite undirected graphG= (V,E) and a subsetA⊆V, the vertex switching ofGbyAis defined...
A graph is vertex-primitive if its automorphism group does not preserve any nontrivial partition of ...
AbstractLet Γ be a graph and let G be a subgroup of automorphisms of Γ. Then G is said to be locally...
This talk is based on the paper by Xiaorui Sun and John Wilmes, "Structure and automorphisms of prim...
AbstractThe fixing number of a graph G is the minimum cardinality of a set S⊂V(G) such that every no...
The minimal degree of a permutation group $G$ is the minimum number of points not fixed by non-ident...
AbstractWe study a graph transformation (defined by Seidel) called switching which, given a graph G ...
AbstractUp to switching isomorphism, there are six ways to put signs on the edges of the Petersen gr...
Let Gamma be a graph and let G be a subgroup of automorphisms of Gamma. Then G is said to be locally...
Given that a large graph admits a group of automorphisms isomorphic to the abstract group G, what is...
AbstractThis paper investigates the automorphism group of a connected and undirected G-symmetric gra...
AbstractA cohomological sufficient condition is found for a switching class of graphs to have a memb...
AbstractThe operation of switching a finite graph was introduced by Seidel, in the study of strongly...
We prove that, for a primitive permutation group G acting on a set X of size n, other than the alter...
We introduce notation and terminology to investigate conditions on a permutation group G sufficient ...
AbstractFor a finite undirected graphG= (V,E) and a subsetA⊆V, the vertex switching ofGbyAis defined...
A graph is vertex-primitive if its automorphism group does not preserve any nontrivial partition of ...
AbstractLet Γ be a graph and let G be a subgroup of automorphisms of Γ. Then G is said to be locally...
This talk is based on the paper by Xiaorui Sun and John Wilmes, "Structure and automorphisms of prim...
AbstractThe fixing number of a graph G is the minimum cardinality of a set S⊂V(G) such that every no...
The minimal degree of a permutation group $G$ is the minimum number of points not fixed by non-ident...
AbstractWe study a graph transformation (defined by Seidel) called switching which, given a graph G ...
AbstractUp to switching isomorphism, there are six ways to put signs on the edges of the Petersen gr...
Let Gamma be a graph and let G be a subgroup of automorphisms of Gamma. Then G is said to be locally...
Given that a large graph admits a group of automorphisms isomorphic to the abstract group G, what is...
AbstractThis paper investigates the automorphism group of a connected and undirected G-symmetric gra...