References
K. A. Baker,Finite equational bases for finite algebras in a congruence distributive equational class, Advances in Math., 24 (1977), 207–243.
T. Evans,Some finitely based varieties of rings, J. Austral. Math. Soc.17 (1974), 246–255.
R. L. Kruse,Identities satisfied by a finite ring, J. Algebra26 (1973), 298–318.
I. V. L'vov,Varieties of associative rings, Algebra i Logika12 (1973), 269–297.
V. L. Murskii,The existence in three valued logic of a closed class with a finite basis having no finite complete system of identities, Dokl. Akad. Nauk. SSSR163 (1965), 815–818.
S. Oates andM. B. Powell,Identical relations in finite groups, J. Algebra1 (1964), 11–39.
S. Oates Macdonald andM. R. Vaughan-Lee, J. Austral. Math. Soc., to appear.
P. Perkins,Bases for equational theories of semigroups, J. Algebra11 (1969), 298–314.
S. V. Polin,Identities of finite algebras, Siberian Math. J. 17 (1976), 1356–1366.
C. Procesi,Rings with polynomial identities, Marcel Dekker Inc., New York 1973.
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Vaughan-Lee, M.R. Laws in finite loops. Algebra Universalis 9, 269–280 (1979). https://doi.org/10.1007/BF02488039
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DOI: https://doi.org/10.1007/BF02488039