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Related papers: Generating minimally transitive permutation groups

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The purpose of this paper is to prove that if $G$ is a transitive permutation group of degree $n\geq 2$, then $G$ can be generated by $\lfloor cn/\sqrt{\log{n}}\rfloor$ elements, where $c:=\sqrt{3}/2$. Owing to the transitive group…

Group Theory · Mathematics 2021-02-22 Gareth Tracey

Let $G$ be a permutation group, and denote with $\mu(G)$ and $b(G)$ its minimal degree and base size respectively. We show that for every $\varepsilon>0$, there exists a transitive permutation group $G$ of degree $n$ with \[ \mu(G)b(G) \geq…

Group Theory · Mathematics 2025-06-24 Lorenzo Guerra , Attila Maróti , Fabio Mastrogiacomo , Pablo Spiga

It is proved in [21] that there is a constant $c$ such that each transitive permutation group of degree $d\ge 2$ can be generated by $\lfloor cd/\sqrt{\log{d}}\rfloor$ elements. In this paper, we explicitly estimate $c$.

Group Theory · Mathematics 2018-01-31 Gareth M. Tracey

The minimal degree of a permutation group $G$ is defined as the minimal number of non-fixed points of a non-trivial element of $G$. In this paper we show that if $G$ is a transitive permutation group of degree $n$ having no non-trivial…

Group Theory · Mathematics 2020-04-16 Primoz Potocnik , Pablo Spiga

We prove an upper bound for the number of cyclic transitive subgroups in a finite permutation group and clarify the structure of the groups for which this bound becomes sharp. We also give an application in the theory of number fields.

Group Theory · Mathematics 2015-02-10 Joachim König

The primary purpose of this paper is to report on the successful enumeration in Magma of representatives of the $195\,826\,352$ conjugacy classes of transitive subgroups of the symmetric group $S_{48}$ of degree 48. In addition, we have…

Group Theory · Mathematics 2021-02-26 Derek Holt , Gordon Royle , Gareth Tracey

We determine upper bounds for the maximum order of an element of a finite almost simple group with socle T in terms of the minimum index m(T) of a maximal subgroup of T: for T not an alternating group we prove that, with finitely many…

Group Theory · Mathematics 2013-01-23 Simon Guest , Joy Morris , Cheryl Praeger , Pablo Spiga

Given two positive integers n and c, we determine an upper bound, as a function of n and c, for the maximum order of a finite nilpotent transitive group of degree n and nilpotency class at most c.

Group Theory · Mathematics 2014-05-23 Eleonora Crestani , Pablo Spiga

We obtain upper bounds on the composition length of a finite permutation group in terms of the degree and the number of orbits, and analogous bounds for primitive, quasiprimitive and semiprimitive groups. Similarly, we obtain upper bounds…

Group Theory · Mathematics 2018-03-15 S. P. Glasby , Cheryl E. Praeger , Kyle Rosa , Gabriel Verret

We give a modern account of Alfred Bochert's results from 1892 on the minimal degree of doubly, triply and quadruply transitive permutation groups.

Group Theory · Mathematics 2022-09-27 Bernd Schomburg

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…

Group Theory · Mathematics 2023-09-20 Anton A. Baykalov , Alice Devillers , Cheryl E. Praeger

In this note we give some new results concerning the subgroup commutativity degree of a finite group $G$. These are obtained by considering the minimum of subgroup commutativity degrees of all sections of $G$.

Group Theory · Mathematics 2018-02-13 Marius Tărnăuceanu

We investigate properties of finite transitive permutation groups $(G, \Omega)$ in which all proper subgroups of $G$ act intransitively on $\Omega.$ In particular, we are interested in reduction theorems for minimally transitive…

Group Theory · Mathematics 2007-05-23 Francesca Dalla Volta , Johannes Siemons

The motion of a graph is the minimum number of vertices that are moved by a non-trivial automorphism. Equivalently, it can be defined as the minimal degree of its automorphism group (as a permutation group on the vertices). In this paper we…

Combinatorics · Mathematics 2025-03-28 Antonio Montero , Primož Potočnik

A subset $\left\{x_{1},x_{2},\hdots,x_{d}\right\}$ of a group $G$ \emph{invariably generates} $G$ if $\left\{x_{1}^{g_{1}},x_{2}^{g_{2}},\hdots,x_{d}^{g_{d}}\right\}$ generates $G$ for every $d$-tuple $(g_{1},g_{2}\hdots,g_{d})\in G^{d}$.…

Group Theory · Mathematics 2018-01-31 Gareth M. Tracey

Each group G of nxn permutation matrices has a corresponding permutation polytope, P(G):=conv(G) in R^{nxn}. We relate the structure of P(G) to the transitivity of G. In particular, we show that if G has t nontrivial orbits, then…

Combinatorics · Mathematics 2007-05-23 Robert Guralnick , David Perkinson

An upper bound on degrees of elements of a minimal generating system for invariants of quivers of dimension (2,...,2) is established over a field of arbitrary characteristic and its precision is estimated. The proof is based on the…

Combinatorics · Mathematics 2012-04-26 A. A. Lopatin

In this paper we study finite semiprimitive permutation groups, that is, groups in which each normal subgroup is transitive or semiregular. We give bounds on the order, base size, minimal degree, fixity, and chief length of an arbitrary…

Group Theory · Mathematics 2018-06-05 Luke Morgan , Cheryl E. Praeger , Kyle Rosa

We show that, there exists a constant $a$ such that, for every subgroup $H$ of a finite group $G$, the number of maximal subgroups of $G$ containing $H$ is bounded above by $a|G:H|^{3/2}$. In particular, a transitive permutation group of…

Group Theory · Mathematics 2019-07-22 Andrea Lucchini , Mariapia Moscatiello , Pablo Spiga

Let M(n, d) be the maximum size of a permutation array on n symbols with pairwise Hamming distance at least d. We use various combinatorial, algebraic, and computational methods to improve lower bounds for M(n, d). We compute the Hamming…

Discrete Mathematics · Computer Science 2016-10-03 Sergey Bereg , Avi Levy , I. Hal Sudborough
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