標題: | Finite-rank perturbations of positive operators and isometries |
作者: | Choi, MD Wu, PY 應用數學系 Department of Applied Mathematics |
關鍵字: | finite-rank perturbation;positive operator;isometry;Wold-Lebesgue decomposition |
公開日期: | 2006 |
摘要: | We completely characterize the ranks of A - B and A(1/2) - B-1/2 for operators A and B on a Hilbert space satisfying A >= B >= 0. Namely, let l and m be nonnegative integers or infinity. Then l = rank(A - B) and m = rank(A(1/2) - B-1/2) for some operators A and B with A >= B >= 0 on a Hilbert space of dimension n (1 <= n <= infinity) if and only if l = m = 0 or 0 < l <= m <= n. In particular, this answers in the negative the question posed by C. Benhida whether for positive operators A and B the finiteness of rank(A - B) implies that of rank(A(1/2) - B-1/2). For two isometries, we give necessary and sufficient conditions in order that they be finite-rank perturbations of each other. One such condition says that, for isometries A and B, A - B has finite rank if and only if A = (I + F)B for some unitary operator I + F with finite-rank F. Another condition is in terms of the parts in the Wold-Lebesgue decompositions of the nonunitary isometries A and B. |
URI: | http://hdl.handle.net/11536/12850 http://dx.doi.org/10.4064/sm173-1-5 |
ISSN: | 0039-3223 |
DOI: | 10.4064/sm173-1-5 |
期刊: | STUDIA MATHEMATICA |
Volume: | 173 |
Issue: | 1 |
起始頁: | 73 |
結束頁: | 79 |
顯示於類別: | 期刊論文 |