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 dim A (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.
| Original language | English |
|---|---|
| Pages (from-to) | 461-470 |
| Number of pages | 10 |
| Journal | Journal of Mathematical Analysis and Applications |
| Volume | 327 |
| Issue number | 1 |
| DOIs | |
| Publication status | Published - 1 Mar 2007 |
| Externally published | Yes |
Keywords
- E-solvable
- Nilpotent operator
- Normal operator
- Semi-simple Lie algebra