2 research outputs found
Improved upper bounds on the domination number of graphs with minimum degree at least five
An algorithmic upper bound on the domination number of graphs in
terms of the order and the minimum degree is proved. It is
demonstrated that the bound improves best previous bounds for any . In particular, for , Xing et al.\ proved in 2006 that
. This bound is improved to . For
, Clark et al.\ in 1998 established , while Bir\'o
et al. recently improved it to . Here the bound is further
improved to . For , the best earlier bound is improved to
In the complement of a dominating set
A set D of vertices of a graph G=(V,E) is a dominating set, if every vertex
of D\V has at least one neighbor that belongs to D. The disjoint domination
number of a graph G is the minimum cardinality of two disjoint dominating
sets of G. We prove upper bounds for the disjoint domination number for
graphs of minimum degree at least 2, for graphs of large minimum degree and
for cubic graphs.A set T of vertices of a graph G=(V,E) is a total
dominating set, if every vertex of G has at least one neighbor that belongs
to T. We characterize graphs of minimum degree 2 without induced 5-cycles
and graphs of minimum degree at least 3 that have a dominating set, a total
dominating set, and a non-empty vertex set that are disjoint.A set I of
vertices of a graph G=(V,E) is an independent set, if all vertices in I are
not adjacent in G. We give a constructive characterization of trees that
have a maximum independent set and a minimum dominating set that are
disjoint and we show that the corresponding decision problem is NP-hard for
general graphs. Additionally, we prove several structural and hardness
results concerning pairs of disjoint sets in graphs which are dominating,
independent, or both. Furthermore, we prove lower bounds for the maximum
cardinality of an independent set of graphs with specifed odd girth and
small average degree.A connected graph G has spanning tree congestion at
most s, if G has a spanning tree T such that for every edge e of T the edge
cut defined in G by the vertex sets of the two components of T-e contains
at most s edges. We prove that every connected graph of order n has
spanning tree congestion at most n^(3/2) and we show that the corresponding
decision problem is NP-hard