http://orcid.org/0000-0002-0777-9200
References
- Abughazalah, N., Etingof, P. (2016). On properties of the lower central series of associative algebras. J. Algebra Appl. 15:1650187 (24 pp.).
- Amberg, B., Sysak, Ya. (2001). Associative rings whose adjoint semigroup is locally nilpotent. Arch. Math. (Basel) 76:426–435.
- Arbesfeld, N., Jordan, D. (2010). New results on the lower central series quotients of a free associative algebra. J. Algebra 323:1813–1825.
- Balagović, M., Balasubramanian, A. (2011). On the lower central series quotients of a graded associative algebra. J. Algebra 328:287–300.
- Bapat, A., Jordan, D. (2013). Lower central series of free algebras in symmetric tensor categories. J. Algebra 373:299–311.
- Bhupatiraju, S., Etingof, P., Jordan, D., Kuszmaul, W., Li, Ja. (2012). Lower central series of a free associative algebra over the integers and finite fields. J. Algebra 372:251–274.
- Cordwell, K., Fei, T., Zhou, K. (2015). On lower central series quotients of finitely generated algebras over ℤ. J. Algebra 423:559–572.
- Deryabina, G., Krasilnikov, A. (2015). The torsion subgroup of the additive group of a Lie nilpotent associative ring of class 3. J. Algebra 428:230–255.
- Dobrovolska, G., Etingof, P. (2008). An upper bound for the lower central series quotients of a free associative algebra. Int. Math. Res. Not. IMRN 12, Art. ID rnn039, 10 pp.
- Dobrovolska, G., Kim, J., Ma, X. (2008). On the lower central series of an associative algebra (with an appendix by Pavel Etingof). J. Algebra 320:213–237.
- Etingof, P., Kim, J., Ma, X. (2009). On universal Lie nilpotent associative algebras. J. Algebra 321:697–703.
- Feigin, B., Shoikhet, B. (2007). On [A,A]∕[A,A,A] and on a Wn-action on the consecutive commutators of free asociative algebras. Math. Res. Lett. 14:781–795.
- Giambruno, A., Koshlukov, P. (2001) On the identities of the Grassmann algebra in characteristic p>0. Israel J. Math. 122:305–316.
- Gordienko, A. S. (2007). Codimensions of commutators of length 4. Russian Math. Surveys 62:187–188.
- Grishin, A. V., Pchelintsev, S. V. (2015). On the centers of relatively free algebras with an identity of Lie nilpotency. Sb. Math. 206:1610–1627.
- Gupta, N., Levin, F. (1983). On the Lie ideals of a ring. J. Algebra 81:225–231.
- Gupta, C. K., Krasil’nikov, A. N. (1999). A solution of a problem of Plotkin an Vovsi and an application to varieties of groups. J. Austral. Math. Soc. Ser. A 67:329–355.
- Jennings, S. A. (1947). On rings whose associated Lie rings are nilpotent. Bull. Amer. Math. Soc. 53:593–597.
- Jordan, D., Orem, H. (2015). An algebro-geometric construction of lower central series of associative algebras. Int. Math. Res. Not. IMRN 15:6330–6352.
- Kerchev, G. (2013). On the filtration of a free algebra by its associative lower central series. J. Algebra 375:322–327.
- Krasil’nikov, A. N. (1997). On the semigroup nilpotency and the Lie nilpotency of associative algebras. Math. Notes 62:426–433.
- Krasilnikov, A. (2013). The additive group of a Lie nilpotent associative ring. J. Algebra 392:10–22.
- Latysev, V. N. (1965). On the choise of basis in a T-ideal. Sibirsk. Mat. Zh. 4:1122–1127 (in Russian).
- Latysev, V. N. (1965). On finite generation of a T-ideal with the element [x1,x2,x3,x4]. Sibirsk. Mat. Zh. 6:1432–1434, (in Russian).
- Riley, D. M., Tasić, V. (1999). Mal’cev nilpotent algebras. Arch. Math. (Basel) 72:22–27.
- Volichenko, I. B. (1978). The T-ideal generated by the element [x1,x2,x3,x4]. Preprint 22, Institute of Mathematics of the Academy os Sciences of the Belorussian SSR (in Russian).