Let Mn be the algebra of all n × n complex matrices and gl(n, C) be the general linear Lie algebra, where n ≥ 2. An invertible linear map φ : gl(n, C) → gl(n, C) preserves solvability in both directions...Let Mn be the algebra of all n × n complex matrices and gl(n, C) be the general linear Lie algebra, where n ≥ 2. An invertible linear map φ : gl(n, C) → gl(n, C) preserves solvability in both directions if both φ and φ-1 map every solvable Lie subalgebra of gl(n, C) to some solvable Lie subalgebra. In this paper we classify the invertible linear maps preserving solvability on gl(n, C) in both directions. As a sequence, such maps coincide with the invertible linear maps preserving commutativity on Mn in both directions.展开更多
基金The NSF (2009J05005) of Fujian Provincea Key Project of Fujian Provincial Universities-Information Technology Research Based on Mathematics
文摘Let Mn be the algebra of all n × n complex matrices and gl(n, C) be the general linear Lie algebra, where n ≥ 2. An invertible linear map φ : gl(n, C) → gl(n, C) preserves solvability in both directions if both φ and φ-1 map every solvable Lie subalgebra of gl(n, C) to some solvable Lie subalgebra. In this paper we classify the invertible linear maps preserving solvability on gl(n, C) in both directions. As a sequence, such maps coincide with the invertible linear maps preserving commutativity on Mn in both directions.