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Solvable Lie Algebras with Nilradical (Q)2n+1 and Their Casimir Invariants

Authors:	LI Xiao-chao JIN Quan-qin

Affiliation:	1. Department of Mathematics, Huanghuai University, Zhumadian 463000, China;2. Department of Mathematics, Tongji University, Shanghai 200092, China

Abstract:	The finite-dimensional indecomposable solvable Lie algebras (s) with (Q)2n+1 as their nilradical are studied and classified and their Casimir invariants are calculated.It turns out that the dimension of (s) is at most dim(Q)2n+1+2.

Keywords:	solvable Lie algebra nilradical Casimir invariant
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