Journal of Lie TheoryVol. 12, No. 1, pp. 69--79 (2002)
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Journal of Lie Theory Vol. 12, No. 1, pp. 69--79 (2002) |
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Integral Structures on H-type Lie AlgebrasGordon Crandall and Józef DodziukGordon CrandallDepartment of Mathematics LaGuardia Community College The City University of New York 31-10 Thomson Avenue Long Island City, NY 11101 crandallgo@lagcc.cuny.edu, Józef Dodziuk Ph.D. Program in Mathematics Graduate Center The City University of New York 365 Fifth Avenue New York, NY 10016 jdodziuk@gc.cuny.edu Abstract: In this paper we prove that every H-type Lie algebra possesses a basis with respect to which the structure constants are integers. Existence of such an integral basis implies via the Mal'cev criterion that all simply connected H-type Lie groups contain co-compact lattices. Since the Campbell-Hausdorff formula is very simple for two-step nilpotent Lie groups we can actually avoid invoking the Mal'cev criterion and exhibit our lattices in an explicit way. As an application, we calculate the isoperimetric dimensions of H-type groups. Full text of the article:
Electronic fulltext finalized on: 30 Oct 2001. This page was last modified: 9 Nov 2001.
© 2001 Heldermann Verlag
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