Journal of Lie TheoryVol. 14, No. 1, pp. 243--270 (2004)
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Journal of Lie Theory Vol. 14, No. 1, pp. 243--270 (2004) |
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Some Constructions in the Theory of Locally Finite Simple Lie AlgebrasYuri Bahturin and Georgia BenkartYuri BahturinDepartment of Mathematics and Statistics Memorial University of Newfoundland St. John's, NF, Canada A1C 5S7 bahturin@mun.ca and Georgia Benkart Department of Mathematics University of Wisconsin--Madison Madison, Wisconsin 53706 USA benkart@math.wisc.edu Abstract: Some locally finite simple Lie algebras are graded by finite (possibly nonreduced) root systems. Many more algebras are sufficiently close to being root graded that they still can be handled by the techniques from that area. In this paper we single out such Lie algebras, describe them, and suggest some applications of such descriptions. Full text of the article:
Electronic version published on: 29 Jan 2004. This page was last modified: 1 Sep 2004.
© 2004 Heldermann Verlag
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