Locating and Total Dominating Sets in Trees

Haynes, Teresa W., Henning, Michael A., Howard, Jamie

01 May 2006

A set S of vertices in a graph G = (V,E) is a total dominating set of G if every vertex of V is adjacent to a vertex in S. We consider total dominating sets of minimum cardinality which have the additional property that distinct vertices of V are totally dominated by distinct subsets of the total dominating set.

differentiating-total dominating set

locating-total dominating set

metric-locating-total dominating set

Curriculum and Instruction

Early Childhood Education

Coalition Graphs of Paths, Cycles, and Trees

Haynes, Teresa W., Hedetniemi, Jason T., Hedetniemi, Stephen T., McRae, Alice A., Mohan, Raghuveer

01 January 2021

A coalition in a graph G =(V, E) consists of two disjoint sets of vertices V1 and V2, neither of which is a dominating set of G but whose union V1 ∪ V2 is a dominating set of G.A coalition partition in a graph G of order n = |V| is a vertex partition π= {V1, V2,⋯, Vk} of V such that every set Vi either is a dominating set consisting of a single vertex of degree n - 1, or is not a dominating set but forms a coalition with another set Vj which is not a dominating set. Associated with every coalition partition πof a graph G is a graph called the coalition graph of G with respect to π, denoted CG(G, π), the vertices of which correspond one-to-one with the sets V1, V2,⋯, Vk of πand two vertices are adjacent in CG(G, π) if and only if their corresponding sets in πform a coalition. In this paper we study coalition graphs, focusing on the coalition graphs of paths, cycles, and trees. We show that there are only finitely many coalition graphs of paths and finitely many coalition graphs of cycles and we identify precisely what they are. On the other hand, we show that there are infinitely many coalition graphs of trees and characterize this family of graphs.

coalition

dominating set

vertex partition

Mathematics and Statistics

ANALYSIS OF THREE LOCALIZED ALGORITHMS FOR CONSTRUCTING DOMINATING SETS IN NETWORKS

Mohammed Ali, Kovan A.

06 April 2015

No description available.

Computer Science

Dominating Set

Localized Algorithms

Global Domination Stable Trees

Still, Elizabeth Marie, Haynes, Teresa W.

08 May 2013

A set of vertices in a graph G is a global dominating set of G if it dominates both G and its complement G. The minimum cardinality of a global dominating set of G is the global domination number of G. We explore the effects of graph modifications (edge removal, vertex removal, and edge addition) on the global domination number. In particular, for each graph modification, we study the global domination stable trees, that is, the trees whose global domination number remains the same upon the modification. We characterize these stable trees having small global domination numbers.

05C69

AMS subject classification

dominating set

global dominating set

global domination stable.

Mathematics and Statistics

Global Domination Stable Trees

Still, Elizabeth Marie, Haynes, Teresa W.

08 May 2013

A set of vertices in a graph G is a global dominating set of G if it dominates both G and its complement G. The minimum cardinality of a global dominating set of G is the global domination number of G. We explore the effects of graph modifications (edge removal, vertex removal, and edge addition) on the global domination number. In particular, for each graph modification, we study the global domination stable trees, that is, the trees whose global domination number remains the same upon the modification. We characterize these stable trees having small global domination numbers.

05C69

AMS subject classification

dominating set

global dominating set

global domination stable.

Mathematics and Statistics

Improved Pebbling Bounds

Chan, Melody, Godbole, Anant P.

06 June 2008

Consider a configuration of pebbles distributed on the vertices of a connected graph of order n. A pebbling step consists of removing two pebbles from a given vertex and placing one pebble on an adjacent vertex. A distribution of pebbles on a graph is called solvable if it is possible to place a pebble on any given vertex using a sequence of pebbling steps. The pebbling number of a graph, denoted f (G), is the minimal number of pebbles such that every configuration of f (G) pebbles on G is solvable. We derive several general upper bounds on the pebbling number, improving previous results.

dominating set

efficient dominating set

graph pebbling

pebbling number

Mathematics and Statistics

Locating and Total Dominating Sets in Trees.

Howard, Jamie Marie

01 May 2004

A set S of vertices in a graph G=(V,E) is a total dominating set of G if every vertex of V is adjacent to some vertex in S. In this thesis, we consider total dominating sets of minimum cardinality which have the additional property that distinct vertices of V are totally dominated by distinct subsets of the total dominating set.

differentiating total dominating set

locating-total dominating set

Physical Sciences and Mathematics

Cooperative Channel State Information Dissemination Schemes in Wireless Ad-hoc Networks

He, Wenmin

12 May 2013

This thesis considers a novel problem of obtaining global channel state information (CSI) at every node in an ad-hoc wireless network. A class of protocols for dissemination and estimation are developed which attempt to minimize the staleness of the estimates throughout the network. This thesis also provides an optimal protocol for CSI dissemination in networks with complete graph topology and a near optimal protocol in networks having incomplete graph topology. In networks with complete graph topology, the protocol for CSI dissemination is shown to have a resemblance to finding Eulerian tours in complete graphs. For networks having incomplete graph topology, a lower bound on maximum staleness is given and a near optimal algorithm based on finding minimum connected dominating sets and proper scheduling is described in this thesis.

channel state information

dominating set

Hamiltonian decomposition

MLST

Cooperative Channel State Information Dissemination Schemes in Wireless Ad-hoc Networks

He, Wenmin

12 May 2013

This thesis considers a novel problem of obtaining global channel state information (CSI) at every node in an ad-hoc wireless network. A class of protocols for dissemination and estimation are developed which attempt to minimize the staleness of the estimates throughout the network. This thesis also provides an optimal protocol for CSI dissemination in networks with complete graph topology and a near optimal protocol in networks having incomplete graph topology. In networks with complete graph topology, the protocol for CSI dissemination is shown to have a resemblance to finding Eulerian tours in complete graphs. For networks having incomplete graph topology, a lower bound on maximum staleness is given and a near optimal algorithm based on finding minimum connected dominating sets and proper scheduling is described in this thesis.

channel state information

dominating set

Hamiltonian decomposition

MLST

Cooperative Channel State Information Dissemination Schemes in Wireless Ad-hoc Networks

He, Wenmin

25 April 2013

This thesis considers a novel problem of obtaining global channel state information (CSI) at every node in an ad-hoc wireless network. A class of protocols for dissemination and estimation are developed which attempt to minimize the staleness of the estimates throughout the network. This thesis also provides an optimal protocol for CSI dissemination in networks with complete graph topology and a near optimal protocol in networks having incomplete graph topology. In networks with complete graph topology, the protocol for CSI dissemination is shown to have a resemblance to finding Eulerian tours in complete graphs. For networks having incomplete graph topology, a lower bound on maximum staleness is given and a near optimal algorithm based on finding minimum connected dominating sets and proper scheduling is described in this thesis.

dominating set

MLST

Hamiltonian decomposition

channel state information