img
Free centre by metabelian Lie rings      
Yazarlar
Doç. Dr. Nil MANSUROĞLU Doç. Dr. Nil MANSUROĞLU
Ahi Evran Üniversitesi, Türkiye
Stöhr Ralph
Özet
We study the free centre-by-metabelian Lie ring, that is, the free Lie ring with the property that the second derived ideal is contained in the centre. We exhibit explicit generating sets for the homogeneous and fine homogeneous components of the second derived ideal. Each of these components is a direct sum of a free abelian group and a (possibly trivial) elementary abelian 2-group. Our generating sets are such that some of their elements generate the torsion subgroup while the remaining ones freely generate a free abelian group. A key ingredient of our approach is the determination of the dimensions of the corresponding homogeneous and fine homogeneous components of the free centre-by-metabelian Lie algebra over fields of characteristic other than 2. For that we exploit a six-term exact sequence of modules over a polynomial ring that is originally defined over the integers, but turns into a sequence whose terms are projective modules after tensoring with a suitable field. Our results correct a partly erroneous theorem in the literature.
Anahtar Kelimeler
Makale Türü Özgün Makale
Makale Alt Türü SSCI, AHCI, SCI, SCI-Exp dergilerinde yayımlanan tam makale
Dergi Adı QUARTERLY JOURNAL OF MATHEMATICS
Dergi ISSN 0033-5606
Dergi Tarandığı Indeksler SCI-Expanded
Makale Dili İngilizce
Basım Tarihi 06-2014
Cilt No 65
Sayı 2
Sayfalar 555 / 579
Doi Numarası 10.1093/qmath/hat017