Your search keyword '"vertex-transitive graphs"' showing total 93 results

1. On vertex‐transitive graphs with a unique hamiltonian cycle.

Author

Miraftab, Babak and Morris, Dave Witte

Subjects

*FREE groups, *NONABELIAN groups, *LOGICAL prediction, *HAMILTONIAN graph theory

Abstract

A graph is said to be uniquely hamiltonian if it has a unique hamiltonian cycle. For a natural extension of this concept to infinite graphs, we find all uniquely hamiltonian vertex‐transitive graphs with finitely many ends, and also discuss some examples with infinitely many ends. In particular, we show each nonabelian free group Fn has a Cayley graph of degree 2n+2 that has a unique hamiltonian circle. (A weaker statement had been conjectured by Georgakopoulos.) Furthermore, we prove that these Cayley graphs of Fn are outerplanar. [ABSTRACT FROM AUTHOR]

Published

2025

2. Simple eigenvalues of cubic vertex-transitive graphs.

Author

Guo, Krystal and Mohar, Bojan

Subjects

EIGENVALUES, GEOMETRIC vertices, GRAPH theory, GRAPHIC methods, EIGENANALYSIS, NUMBER theory

Abstract

If ${\mathbf v} \in {\mathbb R}^{V(X)}$ is an eigenvector for eigenvalue $\lambda $ of a graph X and $\alpha $ is an automorphism of X , then $\alpha ({\mathbf v})$ is also an eigenvector for $\lambda $. Thus, it is rather exceptional for an eigenvalue of a vertex-transitive graph to have multiplicity one. We study cubic vertex-transitive graphs with a nontrivial simple eigenvalue, and discover remarkable connections to arc-transitivity, regular maps, and number theory. [ABSTRACT FROM AUTHOR]

Published

2024

3. On Two-Sided Cayley Graphs of Semigroups and Groups.

Author

Hassani Hajivand, Farshad and Khosravi, Behnam

Subjects

*CAYLEY graphs, *AUTOMORPHISMS

Abstract

In this paper, first we introduce the notion of two-sided Cayley graph of a semigroup. Then, we investigate some fundamental properties of these graphs and we use our results to give partial answers to some problems raised by Iradmusa and Praeger about two-sided group graphs (two-sided Cayley graphs of groups). Specially, as a consequence of our results, we determine all undirected two-sided Cayley graphs of groups which are connected. Furthermore, by introducing the notion of color-preserving automorphisms of a two-sided Cayley graph of a semigroup (group) and calculating them under some assumptions, we determine the family of color-vertex transitive two-sided Cayley graphs of semigroups (groups). [ABSTRACT FROM AUTHOR]

Published

2023

4. The Basic Locally Primitive Graphs of Order Twice a Prime Square.

Author

Ma, Yulong and Lou, Bengong

Subjects

*SQUARE, *CHARTS, diagrams, etc., *CAYLEY graphs, *CLASSIFICATION

Abstract

A graph Γ is called G-basic if G is quasiprimitive or bi-quasiprimitive on the vertex set of Γ , where G ⩽ Aut (Γ) . It is known that locally primitive vertex-transitive graphs are normal covers of basic ones. In this paper, a complete classification of the basic locally primitive vertex-transitive graph of order 2 p 2 is given, where p is an odd prime. [ABSTRACT FROM AUTHOR]

Published

2022

5. The Weisfeiler-Leman algorithm and recognition of graph properties.

Author

Fuhlbrück, Frank, Köbler, Johannes, Ponomarenko, Ilia, and Verbitsky, Oleg

Subjects

*GRAPH algorithms, *PRIME numbers, *ALGORITHMS

Abstract

The k -dimensional Weisfeiler-Leman algorithm (k - WL) is a very useful combinatorial tool in graph isomorphism testing. We address the applicability of k - WL to recognition of graph properties. Let G be an input graph with n vertices. We show that, if n is prime, then vertex-transitivity of G can be seen in a straightforward way from the output of 2 - WL on G and on the vertex-individualized copies of G. This is perhaps the first non-trivial example of using the Weisfeiler-Leman algorithm for recognition of a natural graph property rather than for isomorphism testing. On the other hand, we show that, if n is divisible by 16, then k - WL is unable to distinguish between vertex-transitive and non-vertex-transitive graphs with n vertices unless k = Ω (n). Similar results are obtained for recognition of arc-transitivity. Our lower bounds are based on an analysis of the Cai-Fürer-Immerman construction, which might be of independent interest. In particular, we provide sufficient conditions under which the Cai-Fürer-Immerman graphs can be made colorless. • The Weisfeiler-Leman algorithm is used to recognize vertex-transitivity of graphs with a prime number of vertices • This is perhaps the first example of using it for recognition of a natural graph property rather than for isomorphism testing • This is no longer possible if the number of vertices is divisible by 16 • The negative result is based on an analysis of the Cai-Fürer-Immerman construction • This analysis might be of independent interest as it provides a very straight way of making the CFI graphs colorless [ABSTRACT FROM AUTHOR]

Published

2021

6. On transitive Cayley graphs of pseudo-unitary homogeneous semigroups.

Author

Ilić-Georgijević, Emil

Subjects

*CAYLEY graphs

Abstract

We characterize colour-preserving automorphism vertex transitivity and vertex transitivity of the Cayley graphs of all semigroups in a class of pseudo-unitary homogeneous semigroups. [ABSTRACT FROM AUTHOR]

Published

2021

7. DiscreteZOO: Towards a Fingerprint Database of Discrete Objects

Author

Berčič, Katja, Vidali, Janoš, Hutchison, David, Series Editor, Kanade, Takeo, Series Editor, Kittler, Josef, Series Editor, Kleinberg, Jon M., Series Editor, Mattern, Friedemann, Series Editor, Mitchell, John C., Series Editor, Naor, Moni, Series Editor, Pandu Rangan, C., Series Editor, Steffen, Bernhard, Series Editor, Terzopoulos, Demetri, Series Editor, Tygar, Doug, Series Editor, Weikum, Gerhard, Series Editor, Davenport, James H., editor, Kauers, Manuel, editor, Labahn, George, editor, and Urban, Josef, editor

Published

2018

8. A Spectral Characterization for Concentration of the Cover Time.

Author

Hermon, Jonathan

Abstract

We prove that for a sequence of finite vertex-transitive graphs of increasing sizes, the cover times are asymptotically concentrated if and only if the product of the spectral gap and the expected cover time diverges. In fact, we prove this for general reversible Markov chains under the much weaker assumption (than transitivity) that the maximal hitting time of a state is of the same order as the average hitting time. [ABSTRACT FROM AUTHOR]

Published

2020

9. On Cayley graphs of.

Author

Baburin, Igor A.

Subjects

*AUTOMORPHISM groups, *INTERSECTION graph theory, *ABELIAN groups, *GROUP theory, *CAYLEY graphs, *FREE groups, *VALENCE (Chemistry), *ISOMORPHISM (Mathematics)

Abstract

The generating sets of have been enumerated which consist of integral four‐dimensional vectors with components −1, 0, 1 and allow Cayley graphs without edge intersections in a straight‐edge embedding in a four‐dimensional Euclidean space. Owing to computational restrictions the valency of enumerated graphs has been fixed to 10. Up to isomorphism 58 graphs have been found and characterized by coordination sequences, shortest cycles and automorphism groups. To compute automorphism groups, a novel strategy is introduced that is based on determining vertex stabilizers from the automorphism group of a sufficiently large finite ball cut out from an infinite graph. Six exceptional, rather 'dense' graphs have been identified which are locally isomorphic to a five‐dimensional cubic lattice within a ball of radius 10. They could be built by either interconnecting interpenetrated three‐ or four‐dimensional cubic lattices and therefore necessarily contain Hopf links between quadrangular cycles. As a consequence, a local combinatorial isomorphism does not extend to a local isotopy. [ABSTRACT FROM AUTHOR]

Published

2020

10. DiscreteZOO: A Fingerprint Database of Discrete Objects.

Author

Berčič, Katja and Vidali, Janoš

Abstract

In this paper, we present DiscreteZOO, a project which illustrates some of the possibilities for computer-supported management of collections of finite combinatorial (discrete) objects, in particular graphs with a high degree of symmetry. DiscreteZOO encompasses a data repository, a website and a SageMath Package. [ABSTRACT FROM AUTHOR]

Published

2020

11. Regular and Vertex-Transitive Kähler Graphs Having Commutative Principal and Auxiliary Adjacency Operators.

Author

Adachi, Toshiaki and Chen, Guanyuan

Subjects

*ZETA functions, *MAGNETIC fields

Abstract

A Kähler graph is a compound of two graphs having a common set of vertices and is a discrete model of a Riemannian manifold equipped with magnetic fields. In this paper we study selfadjointness of adjacency operators of Kähler graphs and express their zeta functions in terms of eigenvalues of their principal and auxiliary adjacency operators when they are commutative. Also, we construct finite vertex-transitive Kähler graphs satisfying the commutativity condition. [ABSTRACT FROM AUTHOR]

Published

2020

12. Groups of Order at Most 6,000 Generated by Two Elements, One of Which Is an Involution, and Related Structures

Author

Potočnik, Primož, Spiga, Pablo, Verret, Gabriel, Širáň, Jozef, editor, and Jajcay, Robert, editor

Published

2016

13. Some Meta-Cayley Graphs on Dihedral Groups.

Author

Allie, I. and Mwambene, E.

Subjects

*CAYLEY graphs, *AUTOMORPHISM groups, *AUTOMORPHISMS

Abstract

In this paper, we define meta-Cayley graphs on dihedral groups. We fully determine the automorphism groups of the constructed graphs in question. Further, we prove that some of the graphs that we have constructed do not admit subgroups which act regularly on their vertex set; thus proving that they cannot be represented as Cayley graphs on groups. [ABSTRACT FROM AUTHOR]

Published

2019

14. Local Limits of Graphs

Author

Benjamini, Itai, Bahadoran, Christophe, Series editor, Guillin, Arnaud, Series editor, Serlet, Laurent, Series editor, and Benjamini, Itai

Published

2013

15. Graph Theoretic Methods in Coding Theory

Author

Rouayheb, Salim El, Georghiades, Costas N., Cohen, Leon, editor, Poor, H. Vincent, editor, and Scully, Marlan O., editor

Published

2012

16. On the defect of vertex-transitive graphs of given degree and diameter.

Author

Exoo, Geoffrey, Jajcay, Robert, Mačaj, Martin, and Širáň, Jozef

Subjects

*GEOMETRIC vertices, *GRAPH theory, *NUMBER theory, *TOPOLOGICAL degree, *DIAMETER

Abstract

Abstract We consider the problem of finding largest vertex-transitive graphs of given degree and diameter. Using two classical number theory results due to Niven and Erdős, we prove that for any fixed degree Δ ≥ 3 and any positive integer δ , the order of a largest vertex-transitive Δ-regular graph of diameter D differs from the Moore bound by more than δ for (asymptotically) almost all diameters D ≥ 2. We also obtain an estimate for the growth of this difference, or defect, as a function of D. [ABSTRACT FROM AUTHOR]

Published

2019

17. The total bondage numbers and efficient total dominations of vertex-transitive graphs.

Author

Hu, Fu-Tao, Li, Lu, and Liu, Jia-Bao

Subjects

*DOMINATING set, *GEOMETRIC vertices, *MATHEMATICAL bounds, *TOROIDAL harmonics, *MULTIPLY transitive groups

Abstract

The total domination number of a graph G without isolated vertices is the minimum number of vertices that dominate all vertices in G . The total bondage number of G is the minimum number of edges whose removal enlarges the total domination number. In this paper, we establish a tight lower bound for the total bondage number of a vertex-transitive graph. We also obtain upper bounds for regular graphs by investigating the relation between the total bondage number and the efficient total domination. As applications, we study the total bondage numbers for some circulant graphs and toroidal meshes by characterizing the existence of efficient total dominating sets in these graphs. [ABSTRACT FROM AUTHOR]

Published

2018

18. Cubic vertex-transitive non-Cayley graphs of order 12p.

Author

Zhang, Wei-Juan, Feng, Yan-Quan, and Zhou, Jin-Xin

Abstract

A graph is said to be vertex-transitive non-Cayley if its full automorphism group acts transitively on its vertices and contains no subgroups acting regularly on its vertices. In this paper, a complete classification of cubic vertex-transitive non-Cayley graphs of order 12p, where p is a prime, is given. As a result, there are 11 sporadic and one infinite family of such graphs, of which the sporadic ones occur when p equals 5, 7 or 17, and the infinite family exists if and only if p ≡ 1 (mod 4), and in this family there is a unique graph for a given order. [ABSTRACT FROM AUTHOR]

Published

2018

19. Classification of Vertex-Transitive Cubic Partial Cubes.

Author

Marc, Tilen

Subjects

*HYPERCUBES, *GEOMETRIC vertices, *ISOMORPHISM (Mathematics), *GRAPH theory, *CONVEX geometry

Abstract

Partial cubes are graphs isometrically embeddable into hypercubes. In this article, it is proved that every cubic, vertex-transitive partial cube is isomorphic to one of the following graphs: [ABSTRACT FROM AUTHOR]

Published

2017

20. The endomorphism monoids and automorphism groups of Cayley graphs of semigroups.

Author

Khosravi, Behnam

Subjects

*ENDOMORPHISMS, *CAYLEY graphs, *SEMIGROUPS (Algebra), *AUTOMORPHISM groups, *MONOIDS

Abstract

In this note, we introduce the notions of color-permutable automorphisms and color-permutable vertex-transitive Cayley graphs of semigroups. As a main result, for a finite monoid S and a generating set C of S, we explicitly determine the color-permutable automorphism group of $$\mathrm {Cay}(S,C)$$ [Theorem 1.1]. Also for a monoid S and a generating set C of S, we explicitly determine the color-preserving automorphism group (endomorphism monoid) of $$\mathrm {Cay}(S,C)$$ [Proposition 2.3 and Corollary 2.4]. Then we use these results to characterize when $$\mathrm {Cay}(S,C)$$ is color-endomorphism vertex-transitive [Theorem 3.4]. [ABSTRACT FROM AUTHOR]

Published

2017

21. WHEN IS THE CAYLEY GRAPH OF A SEMIGROUP ISOMORPHIC TO THE CAYLEY GRAPH OF A GROUP.

Author

SHOUFENG WANG

Subjects

*CAYLEY graphs, *ISOMORPHISM (Mathematics), *SEMIGROUPS (Algebra), *ENDOMORPHISMS, *HOMOMORPHISMS

Abstract

It is well known that Cayley graphs of groups are automatically vertex-transitive. A pioneer result of Kelarev and Praeger implies that Cayley graphs of semigroups can be regarded as a source of possibly new vertex-transitive graphs. In this note, we consider the following problem: Is every vertex-transitive Cayley graph of a semigroup isomorphic to a Cayley graph of a group? With the help of the results of Kelarev and Praeger, we show that the vertex-transitive, connected and undirected finite Cayley graphs of semigroups are isomorphic to Cayley graphs of groups, and all finite vertex-transitive Cayley graphs of inverse semigroups are isomorphic to Cayley graphs of groups. Furthermore, some related problems are proposed. [ABSTRACT FROM AUTHOR]

Published

2017

22. On Cayley graphs of completely 0-simple semigroups

Author

Wang Shoufeng and Li Yinghui

Subjects

05c25, 20m20, cayley graphs, vertex-transitive graphs, undirected graphs, completely 0-simple semigroups, Mathematics, QA1-939

Published

2013

23. Matching preclusion for vertex-transitive networks.

Author

Li, Qiuli, He, Jinghua, and Zhang, Heping

Subjects

*MATCHING theory, *GEOMETRIC vertices, *ROBUST statistics, *GRAPH theory, *NUMBER theory

Abstract

In interconnection networks, matching preclusion is a measure of robustness in the event of link failure. Let G be a graph of even order. The matching preclusion number m p ( G ) is defined as the minimum number of edges whose deletion results in a graph without perfect matchings. Many interconnection networks are super matched, that is, their optimal matching preclusion sets are precisely those induced by a single vertex. In this paper, we obtain general results of vertex-transitive graphs including many known networks. A k -regular connected vertex-transitive graph of even order has matching preclusion number k and is super matched except for six classes of graphs. From this many results already known can be directly obtained and matching preclusion for some other networks, such as folded k -cube graphs, Hamming graphs and halved k -cube graphs, are derived. [ABSTRACT FROM AUTHOR]

Published

2016

24. Edge-transitive products.

Author

Hammack, Richard, Imrich, Wilfried, and Klavžar, Sandi

Abstract

This paper concerns finite, edge-transitive direct and strong products, as well as infinite weak Cartesian products. We prove that the direct product of two connected, non-bipartite graphs is edge-transitive if and only if both factors are edge-transitive and at least one is arc-transitive, or one factor is edge-transitive and the other is a complete graph with loops at each vertex. Also, a strong product is edge-transitive if and only if all factors are complete graphs. In addition, a connected, infinite non-trivial Cartesian product graph G is edge-transitive if and only if it is vertex-transitive and if G is a finite weak Cartesian power of a connected, edge- and vertex-transitive graph H, or if G is the weak Cartesian power of a connected, bipartite, edge-transitive graph H that is not vertex-transitive. [ABSTRACT FROM AUTHOR]

Published

2016

25. Multiples of left loops and vertex-transitive graphs

Author

Mwambene Eric

Subjects

vertex-transitive graphs, groupoids, loops, 05c25, 20b25, Mathematics, QA1-939

Published

2005

26. $$Z_{3}$$ -Connectivity of Wreath Product of Graphs.

Author

Zhang, Xiaoxia and Li, Xiangwen

Subjects

*WREATH products (Group theory), *GRAPH connectivity, *TRIANGULARIZATION (Mathematics), *GEOMETRIC vertices, *MATHEMATICAL analysis

Abstract

Let $$G$$ and $$G'$$ be two simple connected nontrivial graphs. Denote by $$G\Box G^{'}$$ and $$G\rho G^{'}$$ the Cartesian product and the Wreath product of $$G$$ and $$G^{'}$$ , respectively. In this paper, we will show two results: (1) if $$G^{'}$$ is a triangularly connected simple graph with $$|V(G^{'})|\ge 3$$ which is neither $$K_{2,t}^{+}$$ nor one specific graph, then $$G\Box G^{'}$$ is $$Z_{3}$$ -connected; (2) if $$G^{'}$$ is a vertex-transitive graph, then $$G\rho G^{'}$$ is $$Z_{3}$$ -connected. [ABSTRACT FROM AUTHOR]

Published

2015

27. Vertex-transitive graphs that have no Hamilton decomposition.

Author

Bryant, Darryn and Dean, Matthew

Subjects

*GEOMETRIC vertices, *GRAPH theory, *MATHEMATICAL decomposition, *CAYLEY graphs, *INFINITY (Mathematics)

Abstract

It is shown that there are infinitely many connected vertex-transitive graphs that have no Hamilton decomposition, including infinitely many Cayley graphs of valency 6, and including Cayley graphs of arbitrarily large valency. [ABSTRACT FROM AUTHOR]

Published

2015

28. Vertex-transitive median graphs of non-exponential growth.

Author

Marc, Tilen

Subjects

*ISOMORPHISM (Mathematics), *GRAPH theory, *HYPERCUBES, *CARTESIAN plane, *FINITE fields, *EXPONENTIAL functions, *LATTICE theory

Abstract

We characterize vertex-transitive median graphs of non-exponential growth as the Cartesian products of finite hypercubes with finite dimensional lattice graphs. Additionally, we prove that every median graph without convex subgraphs isomorphic to K 1 , 3 or the 4-pan graph is isomorphic to the weak Cartesian product of finite paths, rays and two way infinite paths. [ABSTRACT FROM AUTHOR]

Published

2015

29. On the spectrum of Wenger graphs.

Author

Cioabă, Sebastian M., Lazebnik, Felix, and Li, Weiqiang

Subjects

*GRAPH theory, *VECTOR spaces, *FINITE fields, *EIGENVALUES, *MATRICES (Mathematics), *DIMENSIONAL analysis

Abstract

Abstract: Let , where p is a prime and is an integer. For , let P and L be two copies of the -dimensional vector spaces over the finite field . Consider the bipartite graph with partite sets P and L defined as follows: a point is adjacent to a line if and only if the following m equalities hold: for . We call the graphs Wenger graphs. In this paper, we determine all distinct eigenvalues of the adjacency matrix of and their multiplicities. We also survey results on Wenger graphs. [Copyright &y& Elsevier]

Published

2014

30. Automorphisms of a Family of Cubic Graphs.

Author

Zhou, Jin-Xin and Ghasemi, Mohsen

Subjects

*AUTOMORPHISMS, *GRAPH theory, *CAYLEY graphs, *REPRESENTATION theory, *ISOMORPHISM (Mathematics), *VERTEX operator algebras, *SET theory

Abstract

A Cayley graph (G,S) on a group G with respect to a Cayley subset S is said to be normal if the right regular representation R(G) of G is normal in the full automorphism group of (G,S). For a positive integer n, let Γn be a graph with vertex set {xi,yi|i ∈ ℤ2n} and edge set {{xi,xi+1}, {yi,yi+1}, {x2i,y2i+1}, {y2i,x2i+1}|i ∈ ℤ2n}. In this paper, it is shown that Γn is a Cayley graph and its full automorphism group is isomorphic to for n=2, and to for n > 2. Furthermore, we determine all pairs of G and S such that Γn=(G,S) is non-normal for G. Using this, all connected cubic non-normal Cayley graphs of order 8p are constructed explicitly for each prime p. [ABSTRACT FROM AUTHOR]

Published

2013

31. Super cyclically edge-connected vertex-transitive graphs of girth at least 5.

Author

Zhou, Jin and Li, Yan

Subjects

*GRAPH theory, *GRAPH connectivity, *MULTIPLY transitive groups, *INFINITY (Mathematics), *CAYLEY graphs, *MATHEMATICAL analysis

Abstract

A cyclic edge-cut of a graph G is an edge set, the removal of which separates two cycles. If G has a cyclic edge-cut, then it is called cyclically separable. We call a cyclically separable graph super cyclically edge-connected, in short, super- λ, if the removal of any minimum cyclic edge-cut results in a component which is a shortest cycle. In [Zhang, Z., Wang, B.: Super cyclically edge-connected transitive graphs. J. Combin. Optim., 22, 549-562 (2011)], it is proved that a connected vertex-transitive graph is super- λ if G has minimum degree at least 4 and girth at least 6, and the authors also presented a class of nonsuper- λ graphs which have degree 4 and girth 5. In this paper, a characterization of k ( k ≥ 4)-regular vertex-transitive nonsuper- λ graphs of girth 5 is given. Using this, we classify all k ( k ≥ 4)-regular nonsuper- λ Cayley graphs of girth 5, and construct the first infinite family of nonsuper- λ vertex-transitive non-Cayley graphs. [ABSTRACT FROM AUTHOR]

Published

2013

32. On Cayley graphs of completely 0-simple semigroups.

Author

Wang, Shoufeng and Li, Yinghui

Abstract

We give necessary and sufficient conditions for various vertex-transitivity of Cayley graphs of the class of completely 0-simple semigroups and its several subclasses. Moreover, the question when the Cayley graphs of completely 0-simple semigroups are undirected is considered. [ABSTRACT FROM AUTHOR]

Published

2013

33. Extensions of the Scherk–Kemperman Theorem

Author

Hamidoune, Y.O.

Subjects

*GROUP extensions (Mathematics), *AUTOMORPHISMS, *GROUP theory, *SET theory, *CAYLEY graphs, *FINITE groups

Abstract

Abstract: Let be a reflexive relation with a transitive automorphism group. Let F be a finite subset of V containing a fixed element v. We prove that the size of (the image of F) is at least Let be finite subsets of a group G. Applied to Cayley graphs, our result reduces to the following extension of the Scherk–Kemperman Theorem, proved by Kemperman: for every . [Copyright &y& Elsevier]

Published

2010

34. On super restricted edge-connectivity of edge-transitive graphs

Author

Tian, Yingzhi and Meng, Jixiang

Subjects

*GRAPH connectivity, *PATHS & cycles in graph theory, *AUTOMORPHISMS, *MULTIPLY transitive groups, *COMBINATORICS

Abstract

Abstract: Let be a connected graph. Then is called super restricted edge-connected, in short, sup-, if every minimum edge set of such that is disconnected and every component of has at least two vertices, the set of edges being adjacent to a certain edge with minimum edge degree in . In this paper, by studying the -superatoms of , we characterize super restricted edge-connected edge-transitive graphs. As a corollary, we present a sufficient and necessary condition for connected vertex-transitive line graphs to be super vertex-connected. [Copyright &y& Elsevier]

Published

2010

35. Transitive, Locally Finite Median Graphs with Finite Blocks.

Author

Imrich, Wilfried and Klavžar, Sandi

Subjects

*MULTIPLY transitive groups, *FINITE groups, *INFINITE groups, *MEDIAN (Mathematics), *GRAPH theory, *CONTRACTION operators

Abstract

The subject of this paper are infinite, locally finite, vertex-transitive median graphs. It is shown that the finiteness of the Θ-classes of such graphs does not guarantee finite blocks. Blocks become finite if, in addition, no finite sequence of Θ-contractions produces new cut-vertices. It is proved that there are only finitely many vertex-transitive median graphs of given finite degree with finite blocks. An infinite family of vertex-transitive median graphs with finite intransitive blocks is also constructed and the list of vertex-transitive median graphs of degree four is presented. [ABSTRACT FROM AUTHOR]

Published

2009

36. Cayley graphs on left quasi-groups and groupoids representing -generalised Petersen graphs

Author

Mwambene, Eric

Subjects

*CAYLEY graphs, *QUASIGROUPS, *GROUPOIDS, *REPRESENTATIONS of graphs, *PETERSEN graphs, *SET theory, *GENERALIZABILITY theory

Abstract

Abstract: Having presented layered hierarchies of symmetry of vertex-transitive graphs by exploring various classes of algebraic systems, in this note we extend the class of generalised Petersen graphs into higher dimensions and show which ones are Cayley and quasi-Cayley. [Copyright &y& Elsevier]

Published

2009

37. On the number of closed walks in vertex-transitive graphs

Author

Jajcay, Robert, Malnič, Aleksander, and Marušič, Dragan

Subjects

*GRAPH theory, *CAYLEY graphs, *AUTOMORPHISMS, *MATHEMATICAL symmetry

Abstract

Abstract: The results of Širáň and the first author [A construction of vertex-transitive non-Cayley graphs, Australas. J. Combin. 10 (1994) 105–114; More constructions of vertex-transitive non-Cayley graphs based on counting closed walks, Australas. J. Combin. 14 (1996) 121–132] are generalized, and new formulas for the number of closed walks of length or pq, where p and q are primes, valid for all vertex-transitive graphs are found. Based on these formulas, several simple tests for vertex-transitivity are presented, as well as lower bounds on the orders of the smallest vertex- and arc-transitive groups of automorphisms for vertex-transitive graphs of given valence. [Copyright &y& Elsevier]

Published

2007

38. On limit graphs of finite vertex-primitive graphs

Author

Giudici, Michael, Li, Cai Heng, Praeger, Cheryl E., Seress, Ákos, and Trofimov, Vladimir I.

Subjects

*SET theory, *MULTIPLY transitive groups, *FINITE groups, *PERMUTATION groups

Abstract

Abstract: The class of all connected vertex-transitive graphs forms a metric space under a natural combinatorially defined metric. In this paper we study graphs which are limit points in this metric space of the subset consisting of all finite graphs that admit a vertex-primitive group of automorphisms. A description of these limit graphs provides a useful description of the possible local structures of generic finite graphs that admit a vertex-primitive automorphism group. We give an analysis of the possible types of these limit graphs, and suggest directions for future research. Some of the analysis relies on the finite simple group classification. [Copyright &y& Elsevier]

Published

2007

39. Independence and coloring properties of direct products of some vertex-transitive graphs

Author

Valencia-Pabon, Mario and Vera, Juan

Subjects

*GRAPH theory, *OPERATOR algebras, *COMBINATORICS, *ALGEBRA

Abstract

Abstract: Let and denote the independence number and chromatic number of a graph G, respectively. Let be the direct product graph of graphs G and H. We show that if G and H are circular graphs, Kneser graphs, or powers of cycles, then and . [Copyright &y& Elsevier]

Published

2006

40. Homogeneous factorisations of graphs and digraphs

Author

Giudici, Michael, Li, Cai Heng, Potočnik, Primož, and Praeger, Cheryl E.

Subjects

*GRAPH theory, *COMBINATORICS, *GRAPHIC methods, *BIPARTITE graphs

Abstract

Abstract: A homogeneous factorisation is a partition of the arc set of a digraph such that there exist vertex-transitive groups such that fixes each part of setwise while acts transitively on . Homogeneous factorisations of complete graphs have previously been studied by the second and fourth authors, and are a generalisation of vertex-transitive self-complementary digraphs. In this paper we initiate the study of homogeneous factorisations of arbitrary graphs and digraphs. We give a generic group theoretic construction and show that all homogeneous factorisations can be constructed in this way. We also show that the important homogeneous factorisations to study are those where acts transitively on the set of arcs of is a normal subgroup of and is a cyclic group of prime order. [Copyright &y& Elsevier]

Published

2006

41. Multiples of left loops and vertex-transitive graphs.

Author

Mwambene, Eric

Abstract

Via representation of vertex-transitive graphs on groupoids, we show that left loops with units are factors of groups, i.e., left loops are transversals of left cosets on which it is possible to define a binary operation which allows left cancellation. [ABSTRACT FROM AUTHOR]

Published

2005

42. Super restricted edge-connectivity of vertex-transitive graphs

Author

Wang, Ying Qian

Subjects

*GRAPH theory, *ALGEBRA, *COMBINATORICS, *TOPOLOGY

Abstract

Abstract: We prove that a connected vertex-transitive graph G with degree and girth is super restricted edge-connected, that is, if F is a set of edges of G such that is disconnected and every component of has at least two vertices, then F is the set of edges adjacent to a certain edge in G. We also show that neither the condition nor can be weakened. [Copyright &y& Elsevier]

Published

2004

43. Finite s-Arc Transitive Graphs.

Author

Alaeiyan, Mehdi and Talebi, Ali A.

Subjects

*INTEGER programming, *SET theory, *GRAPHIC methods, *MATHEMATICAL programming, *MATHEMATICS

Abstract

Let Γ = (Ω, E) be a connected graph. Then for each i ∈ {0, 1,...,d(Γ)}, we set Γi = {(α, β)|d(α, β) = i}. For G ≤ Aut(Γ), we say that Γ; is a G-distance transitive graph if G is transitive on each of the sets Γ0,..., Γd where d = d(Γ). If G = Aut(Γ), then we say that Γ is distance transitive. In this paper we generalized this notion as follows: Let s be a positive integer, then an s-arc in a graph Γ = (Ω, E) is an (s+ 1)-tuple (α0 ..... αs) of vertices with the property that (αi - 1, αi) ∈ E for 1 ≤ i ≤ s and αi-1 ≠ αi+l for 1 ≤ i ≤ s - 1. Further, Γ is said to be (G, s)-arc transitive if G ≤ AutΓ and G is transitive on the s-arcs of Γ. Suppose that the connected (G,s)-arc transitive graph Γ containing at least one s-arc, then either G is transitive on Ω and Γ is (G,i)-arc transitive for each i satisfying 1 ≤ i ≤ s, or Γ is a tree of diameters s, and if α = (α0, α1, .... , αs) and β = (β0, β1,..., βs) are s-arcs of Γ, then for some ω ∈ {β0, βs} and ω' ∈ {α0, αs}, d(ω, ω' = s. [ABSTRACT FROM AUTHOR]

Published

2004

44. A Spectral Characterization for Concentration of the Cover Time

Author

Jonathan Hermon, Hermon, J [0000-0002-2935-3999], Apollo - University of Cambridge Repository, and Hermon, Jonathan [0000-0002-2935-3999]

Subjects

Statistics and Probability, Sequence, Markov chain, Spectral gap, General Mathematics, Mathematical analysis, Probability (math.PR), Hitting time, State (functional analysis), Mixing times, Vertex-transitive graphs, 60J10, 60J27, Article, 60J27, Cover times, Product (mathematics), FOS: Mathematics, Order (group theory), 60J10, Cover (algebra), Statistics, Probability and Uncertainty, Mathematics - Probability, Mathematics, Hitting times

Abstract

We prove that for a sequence of finite vertex-transitive graphs of increasing sizes, the cover times are asymptotically concentrated if and only if the product of the spectral-gap and the expected cover time diverges. In fact, we prove this for general reversible Markov chains under the much weaker assumption (than transitivity) that the maximal hitting time of a state is of the same order as the average hitting time., Comment: 19 pages. Some typos were fixed in this version

Published

2020

45. ON ISOPERIMETRIC CONNECTIVITY IN VERTEX-TRANSITIVE GRAPHS.

Author

Hamidoune, Y.O., Lladó, A.S., Serra, O., and Tindell, R.

Subjects

*ISOPERIMETRIC inequalities, *MATHEMATICAL inequalities, *PLANE geometry, *GRAPH theory, *GRAPHIC methods, *COMPUTATIONAL mathematics, *MATHEMATICS

Abstract

We shall define the k-isoperimetric connectivity Ak of a regular graph F as the minimum number of arcs originating in a set with cardinality not exceeding half the order of the graph and containing at least k vertices. Clearly λk ≤ dk - ek, where d is the degree of Γ and ek is the maximal number of edges induced on a set of k vertices. We shall show that Cayley graphs with a prime order and arc-transitive graphs have λk = dk-ek, provided that d ≥ 3k - 3. We describe all vertex-transitive graphs where λ2 ≤ 2d - 3. [ABSTRACT FROM AUTHOR]

Published

2000

46. 3-valentni vozliščno tranzitivni grafi

Author

Škvarč, Teja and Potočnik, Primož

Subjects

Cayley's graphs, avtomorfizmi grafa, stabiliser, Magma, Sabidussi's theorem, cubic graphs, udc:519.1, ločno tranzitivni grafi, delovanje grupe na množico, dekompozicija grafa na cikle, hypercubes, cycle decomposition of graph, orbita, vertex-transitive graphs, orbit, stabilizator, perfect matching, popolno prirejanje, Sabidussijev izrek, arc-transitive graphs, group acting on set, kubični grafi, graphs automorphisms, Cayleyjevi grafi, vozliščno tranzitivni grafi, hiperkocke

Abstract

Cilj diplomskega dela je določiti vse kubične vozliščno tranzitivne grafe do nekega v naprej danega reda. $G$-vozliščno tranzitivni graf je graf, za katerega velja, da podgrupa $G$ grupe avtomorfizmov grafa deluje tranzitivno na množico vozlišč. Glede na število orbit delovanja vozliščnega stabilizatorja $G_v$ na soseščini $Gamma(v)$ ločimo tri skupine kubičnih vozliščno tranzitivnih grafov. Prvo skupino, kjer imamo samo eno orbito, nam trditev, ki pravi, da ima delovanje vozliščnega stabilizatorja na soseščini enako orbit kot delovanje grupe $G$ na lokih grafa, poveže s kubičnimi ločno tranzitivnimi grafi. Drugo skupino, kjer imamo tri orbite, nam Sabidussijev izrek poveže s Cayleyjevimi grafi. Tretjo skupino, kjer imamo dve orbiti, pa povežemo s tetravalentnimi ločno tranzitivnimi grafi. The paper's aim is to determinate all cubic vertex-transitive graphs on up to certain order which is given in advance. A graph is $G$-vertex-transitive graph, if subgroup $G$ of graph's group of automorphism acts transitively on its vertex-set. Based on the number of orbits of the vertex-stabiliser $G_v$ in its action on the neighbourhood $Gamma(v)$ we separate cubic vertex-transitive graphs into three groups. The first group is the group of graphs with only one orbit. Theorem, stating that the action of vertex-stabiliser on the neighbourhood has the same number of orbits as the action of group $G$ on arc-set, connects first group's graphs with cubic arc-transitive ones. The second group is the group of graphs with three orbits. Sabidussi's theorem connets second group's graphs with Cayley's graphs. The last group is the group of graphs with two orbits. Graphs from this group are connected with tetravalent arc-transitive graphs.

Published

2019

47. Cycling in hypercubes

Author

Marc, Tilen and Klavžar, Sandi

Subjects

antipodalnost, oriented matroids, antipodality, minorji, metrične lastnosti, minors, convex subgraphs, metric properties, orientirani matroidi, vozliščno tranzitivni grafi, delne kocke, konveksni podgrafi, vertex-transitive graphs, partial cubes

Abstract

We study isometric subgraphs found in hypercubes, called partial cubes. We focus on three aspects: understanding the cycle space of such subgraphs, exploring established subfamilies and properties, and finding symmetric ones. As we show, convex cycles in partial cubes have many intriguing properties, from spanning a simply connected space to forming complex substructures such as intertwinings and traverses. We analyze partial cubes with high girth to obtain results on the structure and degree of such graphs. This knowledge is transferred to symmetric partial cubes to obtain a complete classification of cubic, vertex-transitive ones and to find a connection between partial cubes having mirror automorphisms and finite Coxeter groups. We study various subfamilies of partial cubes to expose a connection between (pseudo-) hyperplane arrangements, antipodal subgraphs, oriented matroids, median graphs, and many other structures found in partial cubes. With our main tool, the concept of partial cube minors, we create a map of partial cubes determining the hierarchical structure of subfamilies of partial cubes, and providing new characterizations and generalizations. Lastly, computational and enumerative properties of partial cubes bounded by their isometric dimension are discussed, together with a result showing that finding isomorphisms of graphs is GI-complete already for one of the simplest classes of partial cubes: median graphs. V disertaciji preučujemo izometrične podgrafe hiperkock, imenovane delne kocke. Osredo- točimo se na tri področja: razumevanju ciklov v takih podgrafih, raziskovanju obstoječih družin ter lastnosti delnih kock in iskanju simetričnih primerov. V delu pokažemo, da imajo konveksni cikli v delnih kockah veliko zanimivih lastnosti, saj na primer napenjajo enostavno povezan prostor in se hkrati prepletajo in tvorijo traverze. Z analizo le teh dokažemo rezultate o strukturi in stopnjah delnih kock, ki imajo le daljše cikle. To znanje uporabimo za klasifikacijo kubičnih, vozliščno tranzitivnih delnih kock in za vzpostavitev povezave med delnimi kockami, ki vsebujejo zrcalne simetrije, in končnimi Coxeterjevimi grupami. Nadalje preučujemo različne družine delnih kock in pokažemo na povezave med razporeditvami hiperravnin v evklidskem prostoru, antipodalnimi grafi, orientiranimi matroidi, medianskimi grafi in mnogimi drugimi strukturami najdenimi v delnih kockah. Z glavnim orodjem te disertacije, minorji delnih kock, dokažemo nove karakterizacije različnih družin delnih kock in oblikujemo zemljevid, ki določa hierarhične lastnosti le teh. Disertacijo zaključimo z izračunom in analizo lastnosti majhnih delnih kock omejenih z njihovo izometrično dimenzijo in dokažemo, da je problem iskanja izomorfizma dveh medianskih grafov GI poln problem.

Published

2018

48. On Cayley graphs of completely 0-simple semigroups

Author

Yinghui Li and Shoufeng Wang

Subjects

Discrete mathematics, 20m20, Cayley graph, General Mathematics, completely 0-simple semigroups, cayley graphs, Combinatorics, Indifference graph, Number theory, Cayley table, Chordal graph, Simple (abstract algebra), 05c25, QA1-939, Special classes of semigroups, undirected graphs, vertex-transitive graphs, Geometry and topology, Mathematics

Abstract

We give necessary and sufficient conditions for various vertex-transitivity of Cayley graphs of the class of completely 0-simple semigroups and its several subclasses. Moreover, the question when the Cayley graphs of completely 0-simple semigroups are undirected is considered.

Published

2013

49. A Note on Vertex-transitive K\'ahler graphs

Author

Yaermaimaiti Tuerxunmaimaiti and Toshiaki Adachi

Subjects

complete graphs, General Mathematics, 0211 other engineering and technologies, regular graphs, 0102 computer and information sciences, 02 engineering and technology, 01 natural sciences, Combinatorics, Indifference graph, Chordal graph, K\"ahler graphs, Mathematics::Symplectic Geometry, vertex-transitive graphs, Mathematics, Discrete mathematics, Clique-sum, Lévy family of graphs, Mathematics::Complex Variables, 021107 urban & regional planning, 1-planar graph, 53C55, Metric dimension, 010201 computation theory & mathematics, Odd graph, Maximal independent set, Mathematics::Differential Geometry, 05C50, partition functions

Abstract

In this paper we construct finite vertex-transitive K\"ahler graphs, which may be considered as discrete models of Hermitian symmetric spaces admitting K\"ahler magnetic fields. We give a condition on cardinality of the set of vertices and the principal and the auxiliary degrees for a vertex-transitive K\"ahler graphs. Also we give some examples of K\"ahler graphs corresponding typical vertex-transitive ordinary graphs.

Published

2016

50. Multiples of left loops and vertex-transitive graphs

Author

E. Mwambene

Subjects

Vertex (graph theory), Discrete mathematics, Transitive relation, groupoids, loops, General Mathematics, Combinatorics, Number theory, 05c25, Binary operation, QA1-939, 20b25, Coset, vertex-transitive graphs, Mathematics, Multiple

Abstract

Via representation of vertex-transitive graphs on groupoids, we show that left loops with units are factors of groups, i.e., left loops are transversals of left cosets on which it is possible to define a binary operation which allows left cancellation.

Published

2005