AbstractFor a given structure D (digraph, multidigraph, or pseudodigraph) and an integer r large enough, a smallest inducing r-regularization of D is constructed. This regularization is an r-regular superstructure of the smallest possible order with bounded arc multiplicity, and containing D as an induced substructure. The sharp upper bound on the number, ρ, of necessary new vertices among such superstructures for n-vertex general digraphs D is determined, ρ being called the inducing regulation number of D. For Δ̃(D) being the maximum among semi-degrees in D, simple n-vertex digraphs D with largest possible ρ are characterized if either r≥Δ̃(D) or r=Δ̃(D) (where the case r=Δ̃ is not a trivial subcase of r≥Δ̃)
AbstractAs a variant of the famous graph reconstruction problem we characterize classes of graphs of...
AbstractThe reinforcement number of a graph G is the minimum cardinality of a set of extra edges who...
AbstractDigraphs in which any two vertices have different pairs of semi-degrees are called fully irr...
AbstractFor a given structure D (digraph, multidigraph, or pseudodigraph) and an integer r large eno...
The aim of this note is to advance the refining of the Erdos-Kelly result on graphical inducing regu...
The aim of this note is to advance the refining of the Erdős-Kelly result on graphical inducing regu...
AbstractIt is shown that every graph on n vertices can be realized as an induced subgraph of a regul...
abstract. The r-Regular Induced Subgraph problem asks, given a graph G and a non-negative integer k,...
AbstractThe r-Regular Induced Subgraph problem asks, given a graph G and a non-negative integer k, w...
AbstractThe bipartite regulation number br(G) of a bipartite graph G with maximum degree d is the mi...
It is shown that 2-dimensional subdivisions can be made regular by moving their vertices within para...
AbstractIn this article we study the parameterized complexity of problems consisting in finding degr...
summary:If $x$ is a vertex of a digraph $D$, then we denote by $d^+(x)$ and $d^-(x)$ the outdegre...
AbstractIt is an elementary exercise to show that any non-trivial simple graph has two vertices with...
A digraph is called irregular if its distinct vertices have distinct degree pairs. An irregular digr...
AbstractAs a variant of the famous graph reconstruction problem we characterize classes of graphs of...
AbstractThe reinforcement number of a graph G is the minimum cardinality of a set of extra edges who...
AbstractDigraphs in which any two vertices have different pairs of semi-degrees are called fully irr...
AbstractFor a given structure D (digraph, multidigraph, or pseudodigraph) and an integer r large eno...
The aim of this note is to advance the refining of the Erdos-Kelly result on graphical inducing regu...
The aim of this note is to advance the refining of the Erdős-Kelly result on graphical inducing regu...
AbstractIt is shown that every graph on n vertices can be realized as an induced subgraph of a regul...
abstract. The r-Regular Induced Subgraph problem asks, given a graph G and a non-negative integer k,...
AbstractThe r-Regular Induced Subgraph problem asks, given a graph G and a non-negative integer k, w...
AbstractThe bipartite regulation number br(G) of a bipartite graph G with maximum degree d is the mi...
It is shown that 2-dimensional subdivisions can be made regular by moving their vertices within para...
AbstractIn this article we study the parameterized complexity of problems consisting in finding degr...
summary:If $x$ is a vertex of a digraph $D$, then we denote by $d^+(x)$ and $d^-(x)$ the outdegre...
AbstractIt is an elementary exercise to show that any non-trivial simple graph has two vertices with...
A digraph is called irregular if its distinct vertices have distinct degree pairs. An irregular digr...
AbstractAs a variant of the famous graph reconstruction problem we characterize classes of graphs of...
AbstractThe reinforcement number of a graph G is the minimum cardinality of a set of extra edges who...
AbstractDigraphs in which any two vertices have different pairs of semi-degrees are called fully irr...