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 F-quasigroups, left and right SM- and E-quasigroups. Information on simple quasigroups from these quasigroup classes is given; for example, finite simple F-quasigroup is a simple group or a simple medial quasigroup. It is proved that any left F-quasigroup is isotopic to the direct product of a group and a left S-loop. Some properties of loop isotopes of F-quasigroups (including M-loops) are pointed out. A left special loop is an isotope of a left F-quasigroup if and only if this loop is isotopic to the direct product of a group and a left S-loop (this is an answer to Belousov ``1a'' problem). Any left E-quasigroup is isotopic to the direct product of an abelian group and a left S-loop (this is an answer to Kinyon-Phillips 2.8(1) problem). As corollary it is obtained that any left FESM-quasigroup is isotopic to the direct product of an abelian group and a left S-loop (this is an answer to Kinyon-Phillips 2.8(2) problem). New proofs of some known results on the structure of commutative Moufang loops are presented.

Publié le : 2009-08-15
Classification:  Group theory,  Generalizations of groups,  Loops,  Quasigroups,  20N05

@article{1281106539,
     author = {Shcherbacov, Victor},
     title = {On the structure of left and right F-, SM-, and E-quasigroups},
     journal = {J. Gen. Lie Theory Appl.},
     volume = {3},
     number = {3},
     year = {2009},
     pages = { 197-259},
     language = {en},
     url = {http://dml.mathdoc.fr/item/1281106539}
}

Shcherbacov, Victor. On the structure of left and right F-, SM-, and E-quasigroups. J. Gen. Lie Theory Appl., Tome 3 (2009) no. 3, pp.  197-259. http://gdmltest.u-ga.fr/item/1281106539/