摘要
We show that (1) if A is a nonzero quasinilpotent operator with ran A n closed for some n ≥ 1, then its numerical range W(A) contains 0 in its interior and has a differentiable boundary, and (2) a noncircular elliptic disc can be the numerical range of a nilpotent operator with nilpotency 3 on an infinite-dimensional separable space. (1) is a generalization of the known result for nonzero nilpotent operators, and (2) is in contrast to the finite-dimensional case, where the only elliptic discs which are the numerical ranges of nilpotent finite matrices are the circular ones centred at the origin.
| 原文 | ???core.languages.en_GB??? |
|---|---|
| 頁(從 - 到) | 1225-1233 |
| 頁數 | 9 |
| 期刊 | Linear and Multilinear Algebra |
| 卷 | 60 |
| 發行號 | 11-12 |
| DOIs | |
| 出版狀態 | 已出版 - 11月 2012 |