Add to ORKGA 2-switch is an edge addition/deletion operation that changes adja-cencies in the graph while preserving the degree of each vertex. A well known result states that graphs with the same degree sequence may be changed into each other via sequences of 2-switches. We show that if a 2-switch changes the isomorphism class of a graph, then it must take place in one of four configurations. We also present a sufficient condition for a 2-switch to change the isomorphism class of a graph. As consequences, we give a new characterization of matrogenic graphs and determine the largest hereditary graph family whose members are all the unique realiza-tions (up to isomorphism) of their respective degree sequences
Godsil-McKay switching is an operation on graphs that doesn’t change the spectrum of the adjacency m...
Seidel's switching is a graph operation , which for a given graph G and one of its vertices v gives ...
Godsil-McKay switching is an operation on graphs that doesn’t change the spectrum of the adjacency m...
AbstractA 2-switch is an edge addition/deletion operation that changes adjacencies in the graph whil...
AbstractA 2-switch is an edge addition/deletion operation that changes adjacencies in the graph whil...
AbstractWe prove that the problem of deciding whether two graphs are switching equivalent is polynom...
Let Γ be a simple connected graph, and let {+,−}^E(Γ) be the set of signatures of Γ. For σ a signatu...
AbstractAn edge-coloured graph G is a vertex set V(G) together with m edge sets distinguished by m c...
Godsil-McKay switching is an operation on graphs that doesn't change the spectrum of the adjacency m...
Godsil-McKay switching is an operation on graphs that doesn’t change the spectrum of the adjacency m...
Godsil-McKay switching is an operation on graphs that doesn't change the spectrum of the adjacency m...
Godsil-McKay switching is an operation on graphs that doesn’t change the spectrum of the adjacency m...
Godsil-McKay switching is an operation on graphs that doesn’t change the spectrum of the adjacency m...
Godsil-McKay switching is an operation on graphs that doesn't change the spectrum of the adjacency m...
Godsil-McKay switching is an operation on graphs that doesn’t change the spectrum of the adjacency m...
Godsil-McKay switching is an operation on graphs that doesn’t change the spectrum of the adjacency m...
Seidel's switching is a graph operation , which for a given graph G and one of its vertices v gives ...
Godsil-McKay switching is an operation on graphs that doesn’t change the spectrum of the adjacency m...
AbstractA 2-switch is an edge addition/deletion operation that changes adjacencies in the graph whil...
AbstractA 2-switch is an edge addition/deletion operation that changes adjacencies in the graph whil...
AbstractWe prove that the problem of deciding whether two graphs are switching equivalent is polynom...
Let Γ be a simple connected graph, and let {+,−}^E(Γ) be the set of signatures of Γ. For σ a signatu...
AbstractAn edge-coloured graph G is a vertex set V(G) together with m edge sets distinguished by m c...
Godsil-McKay switching is an operation on graphs that doesn't change the spectrum of the adjacency m...
Godsil-McKay switching is an operation on graphs that doesn’t change the spectrum of the adjacency m...
Godsil-McKay switching is an operation on graphs that doesn't change the spectrum of the adjacency m...
Godsil-McKay switching is an operation on graphs that doesn’t change the spectrum of the adjacency m...
Godsil-McKay switching is an operation on graphs that doesn’t change the spectrum of the adjacency m...
Godsil-McKay switching is an operation on graphs that doesn't change the spectrum of the adjacency m...
Godsil-McKay switching is an operation on graphs that doesn’t change the spectrum of the adjacency m...
Godsil-McKay switching is an operation on graphs that doesn’t change the spectrum of the adjacency m...
Seidel's switching is a graph operation , which for a given graph G and one of its vertices v gives ...
Godsil-McKay switching is an operation on graphs that doesn’t change the spectrum of the adjacency m...