References
- Bell JP. Growth functions. In: Commutative algebra and noncommutative algebraic geometry. Vol. I. New York: Cambridge Univ. Press; 2015. p. 1–24. (Math sci. res. inst. publ.; 67).
- Bergman GM. A note on growth functions of algebras and semigroups. Research note. Berkeley: University of California; 1978. Unpublished mimeographed notes.
- Borho W, Kraft H. Über die Gelfand-Kirillov dimension. Math Ann. 1976;220:1–24.
- Martinez C, Zelmanov E. Jordan algebras of Gelfand–Kirillov dimension one. J Algebra. 1996;180:211–238.
- Petrogradsky V, Shestakov IP. On Jordan doubles of slow growth of Lie superalgebras. São Paulo J Math Sci. 2019;13:158–176.
- Alahmadi A, Alsulami H, Jain SK, et al. Leavitt path algebras of finite Gelfand-Kirillov dimension. J Algebra Appl. 2012;11(6):1250225-1–1250225-6.
- Qi Z, Xu Y, Zhang J, et al. Growth of nonsymmetric operads. arXiv:2010.12172.
- Bao Y, Ye Y, Zhang J. Truncation of unitary operads. Adv Math. 2020;372:107290-1–107290-75.
- Petrogradsky V, Shestakov IP, Zelmanov E. Nil graded self-similar algebras. Group Geom Dynam. 2010;4:873–900.
- Shestakov IP, Zelmanov E. Some examples of nil Lie algebras. J Eur Math Soc. 2008;10(2):391–398.
- Drensky V, Papistas AI. Gelfand-Kirillov dimension for automorphism groups of relatively free algebras. Algebr Colloq. 2000;7(3):281–290.
- Giambruno A, Zaicev MV. Minimal varieties of algebras of exponential growth. Adv Math. 2003;174:310–323.
- Belov AYa. The Gelfand-Kirillov dimension of relatively free associative algebras (Russian). Mat Sb. 2004;195(12):3–26. English translation: Sb Math. 2004;195(12):1703–1726.
- Centrone L. The GK dimension of relatively free algebras of PI-algebras. J Pure Appl Algebra. 2019;223(7):2977–2996.
- Zhao X, Zhang Y. Gelfand-Kirillov dimensions of modules over differential difference algebras. Algebr Colloq. 2016;23(4):701–720.
- Dzhumadil'daev AS, Ismailov NA, Tulenbaev KM. Free bicommutative algebras. Serdica Math J. 2011;37(1):25–44.
- Drensky V, Zhakhayev BK. Noetherianity and Specht problem for varieties of bicommutative algebras. J Algebra. 2018;499(1):570–582.
- Kaygorodov I, Volkov Yu. The variety of two-dimensional algebras over an algebraically closed field. Can J Math. 2019;71(4):819–842.
- Drensky V. Varieties of bicommutative algebras. Serdica Math J. 2018;44:22pp.
- Kaygorodov I, Páez-Guillán P, Voronin V. The algebraic and geometric classification of nilpotent bicommutative algebras. Algebra Represent Theory. 2020;23:2331–2347.
- Dzhumadil'daev AS, Ismailov NA. Polynomial identities of bicommutative algebras, Lie and Jordan elements. Comm Algebra. 2018;46(12):5241–5251.
- Buchberger B. An algorithm for finding a basis for the residue class ring of a zero-dimensional polynomial ideal [PhD thesis]. Austria: University of Innsbruck; 1965.
- Buchberger B. An algorithmical criteria for the solvability of algebraic systems of equations. Aequationes Math. 1970;4:374–383.
- Shirshov AI. Some algorithmic problems for ε-algebras. Sibirsk Mat Z. 1962;3:132–137.
- Bokut LA, Zelmanov E, Shestakov IP, Latyshev V, editors. Selected works of A. I. Shirshov. Translated by Bremner M, Kochetov M. Basel, Boston, Berlin: Birkhäuser; 2009.
- Bokut LA, Chen YQ. Gröbner-Shirshov bases and their calculation. Bull Math Sci. 2014;4(3):325–395.
- Adams W, Loustaunau P. An introduction to Gröbner bases. Providence (RI): AMS; 1994. (Graduate studies in mathematics; vol. 3).
- Krause G, Lenagan T. Growth of algebras and Gelfand–Kirillov dimension. Providence (RI): AMS; 2000.
- Dzhumadil'daev AS, Tulenbaev KM. Bicommutative algebras. Russ Math Surv. 2003;58:1196–1197.
- Shestakov IP, Zhang Z. Automorphisms of finitely generated relatively free bicommutative algebras. J Pure Appl Algebra. 2021;225:106636-1–106636-19.