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Exponential radicals of solvable Lie groups

Journal of Algebra (2002) 248(2) 790-805
DOI: 10.1006/jabr.2001.9036
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Abstract

For any connected Lie group G, we introduce the notion of exponential radical Exp(G) that is the set of all strictly exponentially distorted elements of G. In case G is a connected simply-connected solvable Lie group, we prove that Exp(G) is a connected normal Lie subgroup in G and the exponential radical of the quotient group G/Exp(G) is trivial. Using this result, we show that the relative growth function of any subgroup in a polycyclic group is either polynomial or exponential. © 2002 Elsevier Science (USA).

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APA

Osin, D. V. (2002). Exponential radicals of solvable Lie groups. Journal of Algebra, 248(2), 790–805. https://doi.org/10.1006/jabr.2001.9036

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