Open AccessPosted Content
Fixing Numbers of Graphs and Groups
Reads0
Chats0
TLDR
The fixing number can be thought of as a variation of the distinguishing number in which every label may be used only once, and not every vertex need be labeled, and the fixing sets of finite abelian groups are characterized and investigated.Abstract:
The fixing number of a graph $G$ is the smallest cardinality of a set of vertices $S$ such that only the trivial automorphism of $G$ fixes every vertex in $S$. The fixing set of a group $\Gamma$ is the set of all fixing numbers of finite graphs with automorphism group $\Gamma$. Several authors have studied the distinguishing number of a graph, the smallest number of labels needed to label $G$ so that the automorphism group of the labeled graph is trivial. The fixing number can be thought of as a variation of the distinguishing number in which every label may be used only once, and not every vertex need be labeled. We characterize the fixing sets of finite abelian groups, and investigate the fixing sets of symmetric groups.read more
Citations
More filters
Journal ArticleDOI
Base size, metric dimension and other invariants of groups and graphs
TL;DR: The base size of a permutation group and the metric dimension of a graph are two of the related parameters of groups, graphs, coherent configurations and association schemes as mentioned in this paper, and they have been repeatedly re-defined with different terminology in various different areas, including computational group theory and the graph isomorphism problem.
Journal ArticleDOI
Coxeter's frieze patterns at the crossroads of algebra, geometry and combinatorics
TL;DR: In this article, the authors review the original work of Coxeter and the new developments around the notion of frieze, focusing on the representation theoretic, geometric and combinatorial approaches.
Journal ArticleDOI
On the Determining Number and the Metric Dimension of Graphs
TL;DR: New proofs and results on the determining number of trees and Cartesian products of graphs are provided, and some lower bounds on the difference between the two parameters are established.
Journal ArticleDOI
The difference between the metric dimension and the determining number of a graph
TL;DR: A technique is developed that uses functions related to locating-dominating sets to obtain lower and upper bounds on the maximum value of the difference between the metric dimension and the determining number of a graph as a function of its order.
Posted Content
Discrete non-commutative integrability: the proof of a conjecture by M. Kontsevich
P. Di Francesco,Rinat Kedem +1 more
TL;DR: In this paper, the authors prove a conjecture of Kontsevich regarding the solutions of rank two recursion relations for non-commutative variables which, in the commutative case, reduce to rank two clusters of affine type.
References
More filters
Book
Algebraic Graph Theory
Chris Godsil,Gordon F. Royle +1 more
TL;DR: The Laplacian of a Graph and Cuts and Flows are compared to the Rank Polynomial.
Journal ArticleDOI
ALGEBRAIC GRAPH THEORY (Graduate Texts in Mathematics 207) By CHRIS GODSIL and GORDON ROYLE: 439 pp., £30.50, ISBN 0-387-95220-9 (Springer, New York, 2001).
Journal ArticleDOI
Symmetry Breaking in Graphs
TL;DR: The distinguishing number of a graph G, denoted by D(G), is the minimum r such that G has an r-distinguishing labeling, and the distinguishingNumber of the complete graph on t vertices is t.
Book
Topics in Graph Automorphisms and Reconstruction
Josef Lauri,Raffaele Scapellato +1 more
TL;DR: In this paper, the authors present an in-depth coverage of important areas of graph theory maintaining a focus on symmetry properties of graphs, including graph automorphisms and the reconstruction problem.