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In this short paper, we survey the results on commutative automorphic loops and give a new construction method. Using this method, we present new classes of commutative automorphic loops of exponent $2$ with trivial center.

On central nilpotency in finite loops with nilpotent inner mapping groups

Markku Niemenmaa, Miikka Rytty (2008)

Commentationes Mathematicae Universitatis Carolinae

In this paper we consider finite loops whose inner mapping groups are nilpotent. We first consider the case where the inner mapping group $I (Q)$ of a loop $Q$ is the direct product of a dihedral group of order $8$ and an abelian group. Our second result deals with the case where $Q$ is a $2$ -loop and $I (Q)$ is a nilpotent group whose nonabelian Sylow subgroups satisfy a special condition. In both cases it turns out that $Q$ is centrally nilpotent.

On centrally nilpotent loops

L. V. Safonova, K. K. Shchukin (2000)

Commentationes Mathematicae Universitatis Carolinae

Using a lemma on subnormal subgroups, the problem of nilpotency of multiplication groups and inner permutation groups of centrally nilpotent loops is discussed.

On commutative loops of order $p q$ with metacyclic inner mapping group and trivial center

Přemysl Jedlička (2010)

Commentationes Mathematicae Universitatis Carolinae

Using a construction of commutative loops with metacyclic inner mapping group and trivial center described by A. Drápal, we enumerate presumably all such loops of order $p q$ , for $p$ and $q$ primes.

On congruence classes of $n$ -groups.

Ušan, Janez (1998)

Novi Sad Journal of Mathematics

On congruences and ideals of partially ordered quasigroups

Milan Demko (2008)

Czechoslovak Mathematical Journal

Some results concerning congruence relations on partially ordered quasigroups (especially, Riesz quasigroups) and ideals of partially ordered loops are presented. These results generalize the assertions which were proved by Fuchs in [5] for partially ordered groups and Riesz groups.

On cyclic hypergroups with period

L. Konguetsof, Thomas N. Vougiouklis, M. Kessoglides, St. Spartalis (1987)

Acta Universitatis Carolinae. Mathematica et Physica

On decompositions of groupoids

Marshall Saade (1972)

Časopis pro pěstování matematiky

On determination of a cyclic order

Vítězslav Novák, Miroslav Novotný (1983)

Czechoslovak Mathematical Journal

On dicyclic groups as inner mapping groups of finite loops

Emma Leppälä, Markku Niemenmaa (2016)

Commentationes Mathematicae Universitatis Carolinae

Let $G$ be a finite group with a dicyclic subgroup $H$ . We show that if there exist $H$ -connected transversals in $G$ , then $G$ is a solvable group. We apply this result to loop theory and show that if the inner mapping group $I (Q)$ of a finite loop $Q$ is dicyclic, then $Q$ is a solvable loop. We also discuss a more general solvability criterion in the case where $I (Q)$ is a certain type of a direct product.

On dihedral 2-groups as inner mapping groups of finite commutative inverse property loops

Markku Niemenmaa (2018)

Commentationes Mathematicae Universitatis Carolinae

We show that finite commutative inverse property loops may not have nonabelian dihedral 2-groups as their inner mapping group.

On Equational Theory of Left Divisible Left Distributive Groupoids

Přemysl Jedlička (2012)

Acta Universitatis Palackianae Olomucensis. Facultas Rerum Naturalium. Mathematica

It is an open question whether the variety generated by the left divisible left distributive groupoids coincides with the variety generated by the left distributive left quasigroups. In this paper we prove that every left divisible left distributive groupoid with the mapping $a \mapsto a^{2}$ surjective lies in the variety generated by the left distributive left quasigroups.

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