Author/Authors :
Peng Cao ?، نويسنده , , Shanli Sun، نويسنده ,
Abstract :
It is proved that the operator Lie algebra ε(T,T ∗) generated by a bounded linear operator T on Hilbert
space H is finite-dimensional if and only if T = N + Q, N is a normal operator, [N,Q] = 0, and
dimA(Q,Q∗) < +∞, where ε(T,T ∗) denotes the smallest Lie algebra containing T,T ∗, and A(Q,Q∗)
denotes the associative subalgebra of B(H ) generated by Q,Q∗. Moreover, we also give a sufficient and
necessary condition for operators to generate finite-dimensional semi-simple Lie algebras. Finally, we prove
that if ε(T,T ∗) is an ad-compact E-solvable Lie algebra, then T is a normal operator.
© 2006 Elsevier Inc. All rights reserved.
MSC: 47B15; 17B20; 17B30
Keywords :
Nilpotent operator , E-solvable , Normal operator , Semi-simple Lie algebra
