29 research outputs found
Roman Domination in Complementary Prism Graphs
A Roman domination function on a complementary prism graph GGc is a function f : V [ V c ! {0, 1, 2} such that every vertex with label 0 has a neighbor with label 2. The Roman domination number R(GGc) of a graph G = (V,E) is the minimum of Px2V [V c f(x) over such functions, where the complementary prism GGc of G is graph obtained from disjoint union of G and its complement Gc by adding edges of a perfect matching between corresponding vertices of G and Gc. In this paper, we have investigated few properties of R(GGc) and its relation with other parameters are obtaine
Semitotal domination in trees
In this paper, we study a parameter that is squeezed between arguably the two
important domination parameters, namely the domination number, , and
the total domination number, . A set of vertices in is a
semitotal dominating set of if it is a dominating set of and every
vertex in S is within distance of another vertex of . The semitotal
domination number, , is the minimum cardinality of a semitotal
dominating set of . We observe that . In this paper, we give a lower bound for the semitotal domination
number of trees and we characterize the extremal trees. In addition, we
characterize trees with equal domination and semitotal domination numbers.Comment: revise
International Journal of Mathematical Combinatorics, Vol.6A
The International J.Mathematical Combinatorics (ISSN 1937-1055) is a fully refereed international journal, sponsored by the MADIS of Chinese Academy of Sciences and published in USA quarterly comprising 460 pages approx. per volume, which publishes original research papers and survey articles in all aspects of Smarandache multi-spaces, Smarandache geometries, mathematical combinatorics, non-euclidean geometry and topology and their applications to other sciences
A new approach on locally checkable problems
By providing a new framework, we extend previous results on locally checkable
problems in bounded treewidth graphs. As a consequence, we show how to solve,
in polynomial time for bounded treewidth graphs, double Roman domination and
Grundy domination, among other problems for which no such algorithm was
previously known. Moreover, by proving that fixed powers of bounded degree and
bounded treewidth graphs are also bounded degree and bounded treewidth graphs,
we can enlarge the family of problems that can be solved in polynomial time for
these graph classes, including distance coloring problems and distance
domination problems (for bounded distances)
Distances and Domination in Graphs
This book presents a compendium of the 10 articles published in the recent Special Issue âDistance and Domination in Graphsâ. The works appearing herein deal with several topics on graph theory that relate to the metric and dominating properties of graphs. The topics of the gathered publications deal with some new open lines of investigations that cover not only graphs, but also digraphs. Different variations in dominating sets or resolving sets are appearing, and a review on some networksâ curvatures is also present