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1. Triangle-free graphs with diameter 2

Author

Devillers, Alice, Kamčev, Nina, McKay, Brendan, Catháin, Padraig Ó, Royle, Gordon, Van de Voorde, Geertrui, Wanless, Ian, and Wood, David R.

Subjects
Mathematics - Combinatorics
Abstract

There are finitely many graphs with diameter $2$ and girth 5. What if the girth 5 assumption is relaxed? Apart from stars, are there finitely many triangle-free graphs with diameter $2$ and no $K_{2,3}$ subgraph? This question is related to the existence of triangle-free strongly regular graphs, but allowing for a range of co-degrees gives the question a more extremal flavour. More generally, for fixed $s$ and $t$, are there infinitely many twin-free triangle-free $K_{s,t}$-free graphs with diameter 2? This paper presents partial results regarding these questions, including computational results, potential Cayley-graph and probabilistic constructions.

Published
2024

2. Higher-dimensional grid-imprimitive block-transitive designs

Author

Alavi, Seyed Hassan, Amarra, Carmen, Daneshkhah, Ashraf, Devillers, Alice, and Praeger, Cheryl E.

Subjects
Mathematics - Combinatorics, 05B05, 05B25, 20B25
Abstract

It was shown in 1989 by Delandtsheer and Doyen that, for a $2$-design with $v$ points and block size $k$, a block-transitive group of automorphisms can be point-imprimitive (that is, leave invariant a nontrivial partition of the point set) only if $v$ is small enough relative to $k$. Recently, exploiting a construction of block-transitive point-imprimitive $2$-designs given by Cameron and the last author, four of the authors studied $2$-designs admitting a block-transitive group that preserves a two-dimensional grid structure on the point set. Here we consider the case where there a block-transitive group preserves a multidimensional grid structure on points. We provide necessary and sufficient conditions for such $2$-designs to exist in terms of the parameters of the grid, and certain `array parameters' which describe a subset of points (which will be a block of the design). Using this criterion, we construct explicit examples of $2$-designs for grids of dimensions three and four, and pose several open questions.

Published
2024

5. Transitive path decompositions of Cartesian products of complete graphs

Author

Gunasekara, Ajani De Vas and Devillers, Alice

Subjects
Mathematics - Combinatorics, Mathematics - Group Theory, 05C38, 05E20, 05C25
Abstract

An $H$-decomposition of a graph $\Gamma$ is a partition of its edge set into subgraphs isomorphic to $H$. A transitive decomposition is a special kind of $H$-decomposition that is highly symmetrical in the sense that the subgraphs (copies of $H$) are preserved and transitively permuted by a group of automorphisms of $\Gamma$. This paper concerns transitive $H$-decompositions of the graph $K_n \Box K_n$ where $H$ is a path. When $n$ is an odd prime, we present a construction for a transitive path decomposition where the paths in the decomposition are considerably large compared to the number of vertices. Our main result supports well-known Gallai's conjecture and an extended version of Ringel's conjecture., Comment: 15 pages, 4 figures

Published
2023

6. Block-transitive 2-designs with a chain of imprimitive partitions

Author

Amarra, Carmen, Devillers, Alice, and Praeger, Cheryl E.

Subjects
Mathematics - Combinatorics
Abstract

More than $30$ years ago, Delandtsheer and Doyen showed that the automorphism group of a block-transitive $2$-design, with blocks of size $k$, could leave invariant a nontrivial point-partition, but only if the number of points was bounded in terms of $k$. Since then examples have been found where there are two nontrivial point partitions, either forming a chain of partitions, or forming a grid structure on the point set. We show, by construction of infinite families of designs, that there is no limit on the length of a chain of invariant point partitions for a block-transitive $2$-design. We introduce the notion of an `array' of a set of points which describes how the set interacts with parts of the various partitions, and we obtain necessary and sufficient conditions in terms of the `array' of a point set, relative to a partition chain, for it to be a block of such a design.

Published
2023

7. Rank three innately transitive permutation groups and related $2$-transitive groups

Author

Baykalov, Anton A., Devillers, Alice, and Praeger, Cheryl E.

Subjects
Mathematics - Group Theory, 20B10, 05B30, 51E30
Abstract

The sets of primitive, quasiprimitive, and innately transitive permutation groups may each be regarded as the building blocks of finite transitive permutation groups, and are analogues of composition factors for abstract finite groups. This paper extends classifications of finite primitive and quasiprimitive groups of rank at most $3$ to a classification for the finite innately transitive groups. The new examples comprise three infinite families and three sporadic examples. A necessary step in this classification was the determination of certain configurations in finite almost simple $2$-transitive groups called special pairs.

Published
2022
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8. Analysing flag-transitive point-imprimitive 2-designs

Author

Devillers, Alice and Praeger, Cheryl E.

Subjects
Mathematics - Combinatorics, Mathematics - Group Theory, 20B25, 05B05
Abstract

In this paper we develop several general methods for analysing flag-transitive point-imprimitive $2$-designs, which give restrictions on both the automorphisms and parameters of such designs. These constitute a tool-kit for analysing these designs and their groups. We apply these methods to complete the classification of flag-transitive, point-imprimitive $2$-$(v,k,\lambda)$ designs with $\lambda$ at most $4$.

Published
2022

9. Tournaments and Even Graphs are Equinumerous

Author

Royle, Gordon F., Praeger, Cheryl E., Glasby, S. P., Freedman, Saul D., and Devillers, Alice

Subjects
Mathematics - Combinatorics, 05C30 (Primary) 05C75, 05A15 (secondary), G.2.1, G.2.2
Abstract

A graph is called odd if there is an orientation of its edges and an automorphism that reverses the sense of an odd number of its edges, and even otherwise. Pontus von Br\"omssen (n\'e Andersson) showed that the existence of such an automorphism is independent of the orientation, and considered the question of counting pairwise non-isomorphic even graphs. Based on computational evidence, he made the rather surprising conjecture that the number of pairwise non-isomorphic even graphs on $n$ vertices is equal to the number of pairwise non-isomorphic tournaments on $n$ vertices. We prove this conjecture using a counting argument with several applications of the Cauchy-Frobenius Theorem., Comment: 9 pages. Corrected minor non-mathematical typos and slightly expanded the introduction

Published
2022
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10. Codes and Designs in Johnson Graphs From Symplectic Actions on Quadratic Forms

Author

Bamberg, John, Devillers, Alice, Ioppolo, Mark, and Praeger, Cheryl E.

Subjects
Mathematics - Combinatorics, Mathematics - Group Theory, 05C25, 05E18, 20B25, 94B25
Abstract

The Johnson graph $J(v, k)$ has as vertices the $k$-subsets of $\mathcal{V}=\{1,\ldots, v\}$, and two vertices are joined by an edge if their intersection has size $k-1$. An \emph{$X$-strongly incidence-transitive code} in $J (v, k)$ is a proper vertex subset $\Gamma$ such that the subgroup $X$ of graph automorphisms leaving $\Gamma$ invariant is transitive on the set $\Gamma$ of `codewords', and for each codeword $\Delta$, the setwise stabiliser $X_\Delta$ is transitive on $\Delta \times (\mathcal{V}\setminus \Delta)$. We classify the \emph{$X$-strongly incidence-transitive codes} in $J(v,k)$ for which $X$ is the symplectic group $\mathrm{Sp}_{2n}(2)$ acting as a $2$-transitive permutation group of degree $2^{2n-1}\pm 2^{n-1}$, where the stabiliser $X_\Delta$ of a codeword $\Delta$ is contained in a \emph{geometric} maximal subgroup of $X$. In particular, we construct two new infinite families of strongly incidence-transitive codes associated with the reducible maximal subgroups of $\mathrm{Sp}_{2n}(2)$.

Published
2022

11. Block-transitive two-designs based on grids

Author

Alavi, Seyed Hassan, Daneshkhah, Ashraf, Devillers, Alice, and Praeger, Cheryl E.

Subjects
Mathematics - Combinatorics, Mathematics - Group Theory, 05B05, 05B25, 20B25
Abstract

We study point-block incidence structures $(\mathcal{P},\mathcal{B})$ for which the point set $\mathcal{P}$ is an $m\times n$ grid. Cameron and the fourth author showed that each block $B$ may be viewed as a subgraph of a complete bipartite graph $\mathbf{K}_{m,n}$ with bipartite parts (biparts) of sizes $m, n$. In the case where $\mathcal{B}$ consists of all the subgraphs isomorphic to $B$, under automorphisms of $\mathbf{K}_{m,n}$ fixing the two biparts, they obtained necessary and sufficient conditions for $(\mathcal{P},\mathcal{B})$ to be a $2$-design, and to be a $3$-design. We first re-interpret these conditions more graph theoretically, and then focus on square grids, and designs admitting the full automorphism group of $\mathbf{K}_{m,m}$. We find necessary and sufficient conditions, again in terms of graph theoretic parameters, for these incidence structures to be $t$-designs, for $t=2, 3$, and give infinite families of examples illustrating that block-transitive, point-primitive $2$-designs based on grids exist for all values of $m$, and flag-transitive, point-primitive examples occur for all even $m$. This approach also allows us to construct a small number of block-transitive $3$-designs based on grids.

Published
2022

13. The groups $G$ satisfying a functional equation $f(xk) = xf(x)$ for some $k \in G$

Author

Bernhardt, Dominik, Boykett, Tim, Devillers, Alice, Flake, Johannes, and Glasby, S. P.

Subjects
Mathematics - Group Theory, 20D15, 20E34, 20F10
Abstract

We study the groups $G$ with the curious property that there exists an element $k\in G$ and a function $f\colon G\to G$ such that $f(xk)=xf(x)$ holds for all $x\in G$. This property arose from the study of near-rings and input-output automata on groups. We call a group with this property a $J$-group. Finite $J$-groups must have odd order, and hence are solvable. We prove that every finite nilpotent group of odd order is a $J$-group if its nilpotency class $c$ satisfies $c\le6$. If $G$ is a finite $p$-group, with $p>2$ and $p^2>2c-1$, then we prove that $G$ is $J$-group. Finally, if $p>2$ and $G$ is a regular $p$-group or, more generally, a power-closed one (i.e., in each section and for each $m\geq1$ the subset of $p^m$-th powers is a subgroup), then we prove that $G$ is a $J$-group., Comment: Reworded first sentence of Introduction. To appear Journal of Group Theory

Published
2021

14. Orbits of Sylow subgroups of finite permutation groups

Author

Bamberg, John, Bors, Alexander, Devillers, Alice, Giudici, Michael, Praeger, Cheryl E., and Royle, Gordon F.

Subjects
Mathematics - Group Theory, 20B05, 20B15
Abstract

We say that a finite group $G$ acting on a set $\Omega$ has Property $(*)_p$ for a prime $p$ if $P_\omega$ is a Sylow $p$-subgroup of $G_\omega$ for all $\omega\in\Omega$ and Sylow $p$-subgroups $P$ of $G$. Property $(*)_p$ arose in the recent work of Tornier (2018) on local Sylow $p$-subgroups of Burger-Mozes groups, and he determined the values of $p$ for which the alternating group $A_n$ and symmetric group $S_n$ acting on $n$ points has Property $(*)_p$. In this paper, we extend this result to finite $2$-transitive groups and we give a structural characterisation result for the finite primitive groups that satisfy Property $(*)_p$ for an allowable prime $p$., Comment: minor corrections

Published
2021

16. Delandtsheer--Doyen parameters for block-transitive point-imprimitive 2-designs

Author

Amarra, Carmen, Devillers, Alice, and Praeger, Cheryl E.

Subjects
Mathematics - Combinatorics, Mathematics - Group Theory, 20B25 (Primary), 05B99 (Secondary)
Abstract

Delandtsheer and Doyen bounded, in terms of the block size, the number of points of a point-imprimitive, block-transitive 2-design. To do this they introduced two integer parameters, m and n, now called Delandtsheer--Doyen parameters, linking the block size with the parameters of an associated imprimitivity system on points. We show that the Delandtsheer--Doyen parameters provide upper bounds on the permutation ranks of the groups induced on the imprimitivity system and on a class of the system. We explore extreme cases where these bounds are attained, give a new construction for a family of designs achieving these bounds, and pose several open questions concerning the Delandtsheer--Doyen parameters., Comment: 12 pages. The research in this paper forms part of Australian Research Council Discovery Project DP200100080. It is also an outcome of the February 2019 Research Retreat of the Centre for the Mathematics of Symmetry and Computation, at the University of Western Australia

Published
2020

17. On flag-transitive imprimitive 2-designs

Author

Devillers, Alice and Praeger, Cheryl E.

Subjects
Mathematics - Combinatorics, Mathematics - Group Theory, 05B05
Abstract

In 1987, Huw Davies proved that, for a flag-transitive point-imprimitive $2$-$(v,k,\lambda)$ design, both the block-size $k$ and the number $v$ of points are bounded by functions of $\lambda$, but he did not make these bounds explicit. In this paper we derive explicit polynomial functions of $\lambda$ bounding $k$ and $v$. For $\lambda\leq 4$ we obtain a list of `numerically feasible' parameter sets $v, k, \lambda$ together with the number of parts and part-size of an invariant point-partition and the size of a nontrivial block-part intersection. Moreover from these parameter sets we determine all examples with fewer than $100$ points. There are exactly eleven such examples, and for one of these designs, a flag-regular, point-imprimitive $2-(36,8,4)$ design with automorphism group ${\rm Sym}(6)$, there seems to be no construction previously available in the literature., Comment: 21 pages. Improved main theorem

Published
2020

18. On flag-transitive 2-(v,k,2) designs

Author

Devillers, Alice, Liang, Hongxue, Praeger, Cheryl E., and Xia, Binzhou

Subjects
Mathematics - Combinatorics, Mathematics - Group Theory, 05B05, 05B25, 20B25
Abstract

This paper is devoted to the classification of flag-transitive 2-(v,k,2) designs. We show that apart from two known symmetric 2-(16,6,2) designs, every flag-transitive subgroup G of the automorphism group of a nontrivial 2-(v,k,2) design is primitive of affine or almost simple type. Moreover, we classify the 2-(v,k,2) designs admitting a flag transitive almost simple group G with socle PSL(n,q) for some n \geq 3. Alongside this analysis, we give a construction for a flag-transitive 2-(v,k-1,k-2) design from a given flag-transitive 2-(v,k,1) design which induces a 2-transitive action on a line. Taking the design of points and lines of the projective space PG(n-1,3) as input to this construction yields a G-flag-transitive 2-(v,3,2) design where G has socle PSL(n,3) and v=(3^n-1)/2. Apart from these designs, our PSL-classification yields exactly one other example, namely the complement of the Fano plane.

Published
2020

19. Partial linear spaces with a rank 3 affine primitive group of automorphisms

Author

Bamberg, John, Devillers, Alice, Fawcett, Joanna B., and Praeger, Cheryl E.

Subjects
Mathematics - Group Theory, Mathematics - Combinatorics, 51E30, 05E18, 20B15, 05B25, 20B25
Abstract

A partial linear space is a pair $(\mathcal{P},\mathcal{L})$ where $\mathcal{P}$ is a non-empty set of points and $\mathcal{L}$ is a collection of subsets of $\mathcal{P}$ called lines such that any two distinct points are contained in at most one line, and every line contains at least two points. A partial linear space is proper when it is not a linear space or a graph. A group of automorphisms $G$ of a proper partial linear space acts transitively on ordered pairs of distinct collinear points and ordered pairs of distinct non-collinear points precisely when $G$ is transitive of rank 3 on points. In this paper, we classify the finite proper partial linear spaces that admit rank 3 affine primitive automorphism groups, except for certain families of small groups, including subgroups of $A\Gamma L_1(q)$. Up to these exceptions, this completes the classification of the finite proper partial linear spaces admitting rank 3 primitive automorphism groups. We also provide a more detailed version of the classification of the rank 3 affine primitive permutation groups, which may be of independent interest., Comment: In this version, we have removed the assumption $V\leq H$ from 18.1 (old 13.2) and we have a new elementary proof of 10.10 (old 13.1). We have also reorganised some of the sections and made minor revisions throughout. 69 pages, 1 figure

Published
2019
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20. Arc-transitive bicirculants

Author

Devillers, Alice, Giudici, Michael, and Jin, Wei

Subjects
Mathematics - Combinatorics, 05E18, 20B25
Abstract

In this paper, we characterise the family of finite arc-transitive bicirculants. We show that every finite arc-transitive bicirculant is a normal $r$-cover of an arc-transitive graph that lies in one of eight infinite families or is one of seven sporadic arc-transitive graphs. Moreover, each of these "basic" graphs is either an arc-transitive bicirculant or an arc-transitive circulant, and each graph in the latter case has an arc-transitive bicirculant normal $r$-cover for some integer $r$.

Published
2019

21. Roots of unity and unreasonable differentiation

Author

Devillers, Alice and Glasby, S. P.

Subjects
Mathematics - Number Theory, 11A07, 11-01
Abstract

We explore when it is legal to differentiate a polynomial evaluated at a root of unity using modular arithmetic., Comment: 4 pages, 0 figures; Public version to comply with Australian Research Council rules (minor wording changes from V1)

Published
2019
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23. The distinguishing number of quasiprimitive and semiprimitive groups

Author

Devillers, Alice, Harper, Scott, and Morgan, Luke

Subjects
Mathematics - Group Theory
Abstract

The distinguishing number of $G \leqslant \sym(\Omega)$ is the smallest size of a partition of $\Omega$ such that only the identity of $G$ fixes all the parts of the partition. Extending earlier results of Cameron, Neumann, Saxl and Seress on the distinguishing number of finite primitive groups, we show that all imprimitive quasiprimitive groups have distinguishing number two, and all non-quasiprimitive semiprimitive groups have distinguishing number two, except for $\mathrm{GL}(2, 3)$ acting on the eight non-zero vectors of $\mathbb F_2^3$, which has distinguishing number three., Comment: 10 pages

Published
2018

24. On $k$-connected-homogeneous graphs

Author

Devillers, Alice, Fawcett, Joanna B., Praeger, Cheryl E., and Zhou, Jin-Xin

Subjects
Mathematics - Group Theory, Mathematics - Combinatorics, 20B25, 05C75, 05E18, 05E20, 05E30
Abstract

A graph $\Gamma$ is $k$-connected-homogeneous ($k$-CH) if $k$ is a positive integer and any isomorphism between connected induced subgraphs of order at most $k$ extends to an automorphism of $\Gamma$, and connected-homogeneous (CH) if this property holds for all $k$. Locally finite, locally connected graphs often fail to be 4-CH because of a combinatorial obstruction called the unique $x$ property; we prove that this property holds for locally strongly regular graphs under various purely combinatorial assumptions. We then classify the locally finite, locally connected 4-CH graphs. We also classify the locally finite, locally disconnected 4-CH graphs containing 3-cycles and induced 4-cycles, and prove that, with the possible exception of locally disconnected graphs containing 3-cycles but no induced 4-cycles, every finite 7-CH graph is CH., Comment: 32 pages, 2 figures, some minor revisions

Published
2018
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26. The circular altitude of a graph

Author

Bamberg, John, Corr, Brian, Devillers, Alice, Hawtin, Daniel, Pivotto, Irene, and Swartz, Eric

Subjects
Mathematics - Combinatorics
Abstract

In this paper we investigate a parameter of graphs, called the circular altitude, introduced by Peter Cameron. We show that the circular altitude provides a lower bound on the circular chromatic number, and hence on the chromatic number, of a graph and investigate this parameter for the iterated Mycielskian of certain graphs.

Published
2016

28. Finite 2-geodesic transitive graphs of prime valency

Author

Devillers, Alice, Jin, Wei, Li, Cai Heng, and Praeger, Cheryl E.

Subjects
Mathematics - Combinatorics, 05E18, 20B25
Abstract

We classify non-complete prime valency graphs satisfying the property that their automorphism group is transitive on both the set of arcs and the set of $2$-geodesics. We prove that either $\Gamma$ is 2-arc transitive or the valency $p$ satisfies $p\equiv 1\pmod 4$, and for each such prime there is a unique graph with this property: it is a non-bipartite antipodal double cover of the complete graph $K_{p+1}$ with automorphism group $PSL(2,p)\times Z_2$ and diameter 3., Comment: arXiv admin note: substantial text overlap with arXiv:1110.2235

Published
2015

30. Locally triangular graphs and rectagraphs with symmetry

Author

Bamberg, John, Devillers, Alice, Fawcett, Joanna B., and Praeger, Cheryl E.

Subjects
Mathematics - Group Theory, Mathematics - Combinatorics, 20B25, 05C75, 05E18, 05E20
Abstract

Locally triangular graphs are known to be halved graphs of bipartite rectagraphs, which are connected triangle-free graphs in which every $2$-arc lies in a unique quadrangle. A graph $\Gamma$ is locally rank 3 if there exists $G\leq \mathrm{Aut}(\Gamma)$ such that for each vertex $u$, the permutation group induced by the vertex stabiliser $G_u$ on the neighbourhood $\Gamma(u)$ is transitive of rank 3. One natural place to seek locally rank 3 graphs is among the locally triangular graphs, where every induced neighbourhood graph is isomorphic to a triangular graph $T_n$. This is because the graph $T_n$, which has vertex set the $2$-subsets of $\{1,\ldots,n\}$ and edge set the pairs of $2$-subsets intersecting at one point, admits a rank 3 group of automorphisms. In this paper, we classify the locally $4$-homogeneous rectagraphs under some additional structural assumptions. We then use this result to classify the connected locally triangular graphs that are also locally rank 3., Comment: 21 pages

Published
2014
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31. Pairwise transitive 2-designs

Author

Devillers, Alice and Praeger, Cheryl E.

Subjects
Mathematics - Combinatorics, Mathematics - Group Theory
Abstract

We classify the pairwise transitive 2-designs, that is, 2-designs such that a group of automorphisms is transitive on the following five sets of ordered pairs: point-pairs, incident point-block pairs, non-incident point-block pairs, intersecting block-pairs and non-intersecting block-pairs. These 2-designs fall into two classes: the symmetric ones and the quasisymmetric ones. The symmetric examples include the symmetric designs from projective geometry, the 11-point biplane, the Higman-Sims design, and designs of points and quadratic forms on symplectic spaces. The quasisymmetric examples arise from affine geometry and the point-line geometry of projective spaces, as well as several sporadic examples., Comment: 28 pages, updated after review process

Published
2014

32. Locally s-distance transitive graphs and pairwise transitive designs

Author

Devillers, Alice, Giudici, Michael, Li, Cai Heng, and Praeger, Cheryl E.

Subjects
Mathematics - Combinatorics, 05C25, 05B05, 20B25
Abstract

The study of locally s-distance transitive graphs initiated by the authors in previous work, identified that graphs with a star quotient are of particular interest. This paper shows that the study of locally s-distance transitive graphs with a star quotient is equivalent to the study of a particular family of designs with strong symmetry properties that we call nicely affine and pairwise transitive. We show that a group acting regularly on the points of such a design must be abelian and give a general construction for this case., Comment: 22 pages, has been accepted for publication in J. Comb. Theory Series A

Published
2013

33. Automorphisms and opposition in twin buildings

Author

Devillers, Alice, Parkinson, James, and Van Maldeghem, Hendrik

Subjects
Mathematics - Combinatorics
Abstract

We show that every automorphism of a thick twin building interchanging the halves of the building maps some residue to an opposite one. Furthermore we show that no automorphism of a locally finite 2-spherical twin building of rank at least 3 maps every residue of one fixed type to an opposite. The main ingredient of the proof is a lemma that states that every duality of a thick finite projective plane admits an absolute point, i.e., a point mapped onto an incident line. Our results also hold for all finite irreducible spherical buildings of rank at least 3, and as a consequence we deduce that every involution of a thick irreducible finite spherical building of rank at least 3 has a fixed residue.

Published
2012

34. Line graphs and $2$-geodesic transitivity

Author

Devillers, Alice, Jin, Wei, Li, Cai Heng, and Praeger, Cheryl E.

Subjects
Mathematics - Combinatorics
Abstract

For a graph $\Gamma$, a positive integer $s$ and a subgroup $G\leq \Aut(\Gamma)$, we prove that $G$ is transitive on the set of $s$-arcs of $\Gamma$ if and only if $\Gamma$ has girth at least $2(s-1)$ and $G$ is transitive on the set of $(s-1)$-geodesics of its line graph. As applications, we first prove that the only non-complete locally cyclic $2$-geodesic transitive graphs are the complete multipartite graph $K_{3[2]}$ and the icosahedron. Secondly we classify 2-geodesic transitive graphs of valency 4 and girth 3, and determine which of them are geodesic transitive.

Published
2012

35. On distance, geodesic and arc transitivity of graphs

Author

Devillers, Alice, Jin, Wei, Li, Cai Heng, and Praeger, Cheryl E.

Subjects
Mathematics - Combinatorics
Abstract

We compare three transitivity properties of finite graphs, namely, for a positive integer $s$, $s$-distance transitivity, $s$-geodesic transitivity and $s$-arc transitivity. It is known that if a finite graph is $s$-arc transitive but not $(s+1)$-arc transitive then $s\leq 7$ and $s\neq 6$. We show that there are infinitely many geodesic transitive graphs with this property for each of these values of $s$, and that these graphs can have arbitrarily large diameter if and only if $1\leq s\leq 3$. Moreover, for a prime $p$ we prove that there exists a graph of valency $p$ that is 2-geodesic transitive but not 2-arc transitive if and only if $p\equiv 1\pmod 4$, and for each such prime there is a unique graph with this property: it is an antipodal double cover of the complete graph $K_{p+1}$ and is geodesic transitive with automorphism group $PSL(2,p)\times Z_2$.

Published
2011

36. A classification of graphs whose subdivision graphs are locally $G$-distance transitive

Author

Daneshkhah, Ashraf and Devillers, Alice

Subjects
Mathematics - Combinatorics, Mathematics - Group Theory
Abstract

The subdivision graph $S(\Sigma)$ of a connected graph $\Sigma$ is constructed by adding a vertex in the middle of each edge. In a previous paper written with Cheryl E. Praeger, we characterised the graphs $\Sigma$ such that $S(\Sigma)$ is locally $(G,s)$-distance transitive for $s\leq 2\, diam(\Sigma)-1$ and some $G\leq Aut(\Sigma)$. In this paper, we solve the remaining cases by classifying all the graphs $\Sigma$ such that the subdivision graphs is locally $(G,s)$-distance transitive for $s\geq 2\, diam(\Sigma)$ and some $G\leq Aut(\Sigma)$. In particular, their subdivision graph are always locally $G$-distance transitive, except for the complete graphs., Comment: 10 pages

Published
2011

37. An infinite family of biquasiprimitive 2-arc transitive cubic graphs

Author

Devillers, Alice, Giudici, Michael, Li, Cai Heng, and Praeger, Cheryl E.

Subjects
Mathematics - Group Theory
Abstract

A new infinite family of bipartite cubic 3-arc transitive graphs is constructed and studied. They provide the first known examples admitting a 2-arc transitive vertex-biquasiprimitive group of automorphisms for which the index two subgroup fixing each half of the bipartition is not quasiprimitive on either bipartite half., Comment: 19 pages

Published
2011

38. Symmetry properties of subdivision graphs

Author

Daneshkhah, Ashraf, Devillers, Alice, and Praeger, Cheryl E.

Subjects
Mathematics - Group Theory, Mathematics - Combinatorics
Abstract

The subdivision graph $S(\Sigma)$ of a graph $\Sigma$ is obtained from $\Sigma$ by `adding a vertex' in the middle of every edge of $\Si$. Various symmetry properties of $\S(\Sigma)$ are studied. We prove that, for a connected graph $\Sigma$, $S(\Sigma)$ is locally $s$-arc transitive if and only if $\Sigma$ is $\lceil\frac{s+1}{2}\rceil$-arc transitive. The diameter of $S(\Sigma)$ is $2d+\delta$, where $\Sigma$ has diameter $d$ and $0\leqslant \delta\leqslant 2$, and local $s$-distance transitivity of $\S(\Sigma)$ is defined for $1\leqslant s\leqslant 2d+\delta$. In the general case where $s\leqslant 2d-1$ we prove that $S(\Sigma)$ is locally $s$-distance transitive if and only if $\Sigma$ is $\lceil\frac{s+1}{2}\rceil$-arc transitive. For the remaining values of $s$, namely $2d\leqslant s\leqslant 2d+\delta$, we classify the graphs $\Sigma$ for which $S(\Sigma)$ is locally $s$-distance transitive in the cases, $s\leqslant 5$ and $s\geqslant 15+\delta$. The cases $\max\{2d, 6\}\leqslant s\leqslant \min\{2d+\delta, 14+\delta\}$ remain open.

Published
2010

39. Locally $s$-distance transitive graphs

Author

Devillers, Alice, Giudici, Michael, Li, Cai Heng, and Praeger, Cheryl E.

Subjects
Mathematics - Combinatorics, Mathematics - Group Theory, 05C12
Abstract

We give a unified approach to analysing, for each positive integer $s$, a class of finite connected graphs that contains all the distance transitive graphs as well as the locally $s$-arc transitive graphs of diameter at least $s$. A graph is in the class if it is connected and if, for each vertex $v$, the subgroup of automorphisms fixing $v$ acts transitively on the set of vertices at distance $i$ from $v$, for each $i$ from 1 to $s$. We prove that this class is closed under forming normal quotients. Several graphs in the class are designated as degenerate, and a nondegenerate graph in the class is called basic if all its nontrivial normal quotients are degenerate. We prove that, for $s\geq 2$, a nondegenerate, nonbasic graph in the class is either a complete multipartite graph, or a normal cover of a basic graph. We prove further that, apart from the complete bipartite graphs, each basic graph admits a faithful quasiprimitive action on each of its (1 or 2) vertex orbits, or a biquasiprimitive action. These results invite detailed additional analysis of the basic graphs using the theory of quasiprimitive permutation groups., Comment: Revised after referee reports

Published
2010

40. On imprimitive rank 3 permutation groups

Author

Devillers, Alice, Giudici, Michael, Li, Cai Heng, Pearce, Geoffrey, and Praeger, Cheryl E.

Subjects
Mathematics - Group Theory, 20B05
Abstract

A classification is given of rank 3 group actions which are quasiprimitive but not primitive. There are two infinite families and a finite number of individual imprimitive examples. When combined with earlier work of Bannai, Kantor, Liebler, Liebeck and Saxl, this yields a classification of all quasiprimitive rank 3 permutation groups. Our classification is achieved by first classifying imprimitive almost simple permutation groups which induce a 2-transitive action on a block system and for which a block stabiliser acts 2-transitively on the block. We also determine those imprimitive rank 3 permutation groups $G$ such that the induced action on a block is almost simple and $G$ does not contain the full socle of the natural wreath product in which $G$ embeds., Comment: updated after revisions

Published
2010
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41. Quotients of incidence geometries

Author

Cara, Philippe, Devillers, Alice, Giudici, Michael, and Praeger, Cheryl E.

Subjects
Mathematics - Combinatorics, Mathematics - Group Theory, 05B25, 51E24, 20B25
Abstract

We develop a theory for quotients of geometries and obtain sufficient conditions for the quotient of a geometry to be a geometry. These conditions are compared with earlier work on quotients, in particular by Pasini and Tits. We also explore geometric properties such as connectivity, firmness and transitivity conditions to determine when they are preserved under the quotienting operation. We show that the class of coset pregeometries, which contains all flag-transitive geometries, is closed under an appropriate quotienting operation., Comment: 26 pages, 5 figures

Published
2009
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44. Codistances of 3-spherical buildings

Author

Devillers, Alice, Mühlherr, Bernhard, and Van Maldeghem, Hendrik

Subjects
Mathematics - Group Theory, Mathematics - Combinatorics, 20E42, 20G40, 51E24
Abstract

We show that a 3-spherical building in which each rank 2 residue is connected far away from a chamber, and each rank 3 residue is simply 2-connected far away from a chamber, admits a twinning (i.e., is one half of a twin building) as soon as it admits a codistance, i.e., a twinning with a single chamber., Comment: 35 pages; revised after a referee's comments

Published
2008

45. Primitive decompositions of Johnson graphs

Author

Devillers, Alice, Giudici, Michael, Li, Cai Heng, and Praeger, Cheryl E.

Subjects
Mathematics - Combinatorics, 05C25, 20B25
Abstract

A transitive decomposition of a graph is a partition of the edge set together with a group of automorphisms which transitively permutes the parts. In this paper we determine all transitive decompositions of the Johnson graphs such that the group preserving the partition is arc-transitive and acts primitively on the parts., Comment: 35 pages

Published
2007

46. The sphericity of the complex of non-degenerate subspaces

Author

Devillers, Alice, Köhl, Ralf, and Muhlherr, Bernhard

Subjects
Mathematics - Combinatorics, Mathematics - Group Theory
Abstract

We prove that the complex of proper non-trivial non-degenerate subspaces of a finite-dimensional vector space endowed with a non-degenerate sesquilinear form is homotopy equivalent to a wedge of spheres. Additionally, we show that the same is true for a slight generalization, the so-called generalized Phan geometries of type A_n. These generalized Phan geometries occur as relative links of certain filtrations. Their sphericity implies finiteness properties of suitable arithmetic groups and allows for a revision of Phan's group-theoretical local recognition of suitable finite groups of Lie type with simply laced diagram.

Published
2007

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