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Book Review
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Book Information
Author(s):
Y. A. Bahturin, A. A. Mikhalev, V. M. Petrogradsky, and M. V. Zaicev
Title:
Infinite dimensional Lie superalgebras
Additional book information:
de Gruyter Expositions in Mathematics, vol. 7, Walter de Gruyter, Berlin and New York, 1992, 250 pp., US$89.00. ISBN 3-11-012974-4
References:
- [1]
- A.Z. Anan\cprime in, Locally finitely approximable and locally representable varieties of algebras, Algebra and Logic \textbf{16} (1978), 1--16.
- [2]
- V.G. Kac, Lie superalgebras, Adv. Math. \textbf{26} (1977), 8--96.
- [3]
- A.I. Mal'cev, On representations of infinite dimensional algebras, Mat. Sb. \textbf{13} (1943), 263--285.
- [4]
- V. Rittenberg and D. Wyler, Sequences of $\Z _2\oplus \Z _2$ graded Lie algebras and superalgebras, J. Math. Phys. \textbf{19} (1978), 2193--2200.
- [5]
- V. Rittenberg and D. Wyler, Generalized superalgebras, Nuclear Phys. B \textbf{139} (1978), 189--202.
- [6]
- M. Scheunert, The theory of Lie superalgebras. An introduction, Lecture Notes in Math., vol. 716, Springer-Verlag, New York, Heidelberg, and Berlin, 1979.
- [7]
- M. A. Vasil\cprime ev, deSitter supergravity with positive cosmological constant and generalized Lie superalgebras, Classical Quantum Gravity \textbf{2} (1985), 645--659.
Additional Information:
Reviewer(s):
Eric
Behr
Review Information:
Journal:
Bull. Amer. Math. Soc.
31
(1994),
91-93.
DOI:
10.1090/S0273-0979-1994-00482-3
PII:
S 0273-0979(1994)00482-3
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