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Related papers: The Structure of Commutative Automorphic Loops

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We study conjugacy closed loops (CC-loops) and power-associative CC-loops (PACC-loops). If $Q$ is a PACC-loop with nucleus $N$, then $Q/N$ is an abelian group of exponent 12; if in addition $Q$ is finite, then $|Q|$ is divisible by 16 or by…

Group Theory · Mathematics 2008-01-15 Michael K. Kinyon , Kenneth Kunen

A \emph{loop} $(B,\cdot)$ is a set $B$ together with a binary operation $\cdot$ such that (i) for each $a\in B$, the left and right translation mappings $L_{a}:B\to B: x \mapsto a\cdot x$ and $R_{a}:B\to B: x \mapsto x\cdot a$ are…

Group Theory · Mathematics 2007-05-23 Oliver Jones , Michael K. Kinyon

A heap is a structure with a ternary operation which is intuitively a group with forgotten unit element. Quantum heaps are associative algebras with a ternary cooperation which are to the Hopf algebras what heaps are to groups, and, in…

Quantum Algebra · Mathematics 2008-11-26 Zoran Škoda

Many common finite p-groups admit automorphisms of order coprime to p, and when p is odd, it is reasonably difficult to find finite p-groups whose automorphism group is a p-group. Yet the goal of this paper is to prove that the automorphism…

Group Theory · Mathematics 2013-05-09 Geir T. Helleloid , Ursula Martin

The Cayley-Dickson loop Q_n is the multiplicative closure of basic elements of the algebra constructed by n applications of the Cayley-Dickson doubling process (the first few examples of such algebras are real numbers, complex numbers,…

Group Theory · Mathematics 2012-04-24 Jenya Kirshtein

We define a homomorphism from (a certain extension of) the fundamental group of the Hamiltonian automorphism group of a symplectic manifold to the group of invertibles in its quantum cohomology ring. The manifold must satify a technical…

dg-ga · Mathematics 2008-02-03 Paul Seidel

We determine the structure of automorphism group or each nonsplit metacyclic 2-group. This completes the work on automorphism groups of metacyclic $p$-groups.

Group Theory · Mathematics 2017-06-27 Haimiao Chen

We prove that every finite, commutative automorphic loop is solvable. We also prove that every finite, automorphic 2-loop is solvable. The main idea of the proof is to associate a simple Lie algebra of characteristic 2 to a hypothetical…

Group Theory · Mathematics 2012-10-01 Alexandr Grishkov , Michael Kinyon , Gabor Nagy

The strong isomorphism classes of extensions of finite groups are parametrized by orbits of a prescribed action on the second cohomology group. We study these orbits in the case of extensions of a finite abelian $p$-group by a cyclic factor…

Group Theory · Mathematics 2023-09-25 Oihana Garaialde Ocaña , Mima Stanojkovski

The monography examines the problem of constructing a group of automorphisms of a graph. A graph automorphism is a mapping of a set of vertices onto itself that preserves adjacency. The set of such automorphisms forms a vertex group of a…

History and Overview · Mathematics 2024-07-18 Sergey Kurapov , Maxim Davidovsky

We show that each half-automorphism of a finite automorphic Moufang loop is trivial. In general this is not true for finite left automorphic Moufang loops and for finite automorphic loops.

Group Theory · Mathematics 2014-12-17 A. Grishkov , M. L. Merlini Giuliani , M. Rasskazova , L. Sabinina

A left Bol loop is a loop satisfying $x(y(xz)) = (x(yx))z$. The commutant of a loop is the set of elements which commute with all elements of the loop. In a finite Bol loop of odd order or of order $2k$, $k$ odd, the commutant is a subloop.…

Group Theory · Mathematics 2016-08-16 Michael K. Kinyon , J. D. Phillips , Petr Vojtěchovský

We record for reference a detailed description of the automorphism groups of the groups of order $p^{2} q$, where $p$ and $q$ are distinct primes.

Group Theory · Mathematics 2025-09-12 E. Campedel , A. Caranti , I. Del Corso

We study the topological structure of the automorphism groups of compact quantum groups showing that, in parallel to a classical result due to Iwasawa, the connected component of identity of the automorphism group and of the "inner"…

Operator Algebras · Mathematics 2017-01-17 Alexandru Chirvasitu , Issan Patri

For any algebraically closed field $K$ and any endomorphism $f$ of $\mathbb{P}^1(K)$ of degree at least 2, the automorphisms of $f$ are the M\"obius transformations that commute with $f$, and these form a finite subgroup of…

Dynamical Systems · Mathematics 2022-04-29 Julia Cai , Benjamin Hutz , Leo Mayer , Max Weinreich

The existence of A$_\rho$-loops, A$_\lambda$-loops and A$_\mu$-loops that are neither extra loops nor CC-loops such that any two of their inner mappings $R(x,y),L(x,y)$ and $T(x)$ commute while the other one is of order 2 is shown.

General Mathematics · Mathematics 2010-03-09 Temitope Gbolahan Jaiyeola , Olushola John Adeniran

We show that in a weak commutative inverse property loop, such as a Bruck loop, if $\alpha$ is a right [left] pseudoautomorphism with companion $c$, then $c$ [$c^2$] must lie in the left nucleus. In particular, for any such loop with…

Group Theory · Mathematics 2012-04-30 Mark Greer , Michael Kinyon

Let $F$ be a perfect field and $M^*(F)$ the nonassociative simple Moufang loop consisting of the units in the (unique) split octonion algebra $O(F)$ modulo the center. Then $Aut(M^*(F))$ is equal to $G_2(F) \rtimes Aut(F)$. In particular,…

Group Theory · Mathematics 2009-11-13 Gábor P. Nagy , Petr Vojtěchovský

It is proved that any left F-quasigroup is isomorphic to the direct product of a left F-quasigroup with a unique idempotent element and isotope of a special form of a left distributive quasigroup. The similar theorems are proved for right…

Group Theory · Mathematics 2008-11-12 V. A. Shcherbacov

For a big class of commutative rings R every continuous R-automorphism of R[[X_1,...,X_n]] with the identity linear part is in the commutator subgroup of Aut(R[[X_1,...,X_n]]). An explicit bound for the number of the involved commutators…

Commutative Algebra · Mathematics 2007-05-23 Joseph Gubeladze , Zaza Mushkudiani