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- 2015
标准算子代数上保因子的可加映射
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Abstract:
摘要: 设A和B分别是复Banach空间X和Y上的标准算子代数. 刻画了从A到B的双边保左(右)因子或双边保因子的可加满射.
Abstract: Let A and B be standard operator algebras on complex Banach spaces X and Y, respectively. A characterization of additive surjection Φ: A →B which preserves left(right) divisors in both directions or preserves divisors in both directions is given
| [1] | JI Guoxing, GAO Yaling. Maps preserving operator pairs whose products are projections[J]. Linear Algebra and its Applications, 2010, 433(7):1348-1364. |
| [2] | LIU Lei, JI Guoxing. Maps preserving product <em>X<sup>*</sup>Y</em>+<em>YX<sup>*</sup></em> on factor von Neumann algebras[J]. Linear and Multilinear Algebra, 2011, 59(9):951-955. |
| [3] | 李荣,吉国兴. 保持算子值域或核包含关系的可加映射[J]. 山东大学学报:理学版,2014, 49(2):42-45. LI Rong, JI Guoxing. Additive maps preserving operator range or kernel inclusion[J]. Journal of Shandong University: Natural Science, 2014, 49(2):42-45. |
| [4] | LI Chi-Kwong, TSING Nam-Kiu. Linear preserver problems: A brief introduction and some special techniques[J]. Linear Algebra and its Applications, 1992, 162-164:217-235. |
| [5] | MOLNáR L. On isomorphisms of standard operator algebras[J]. Studia Mathematica, 2000, 142(3):295-302. |
| [6] | OMLADI? M, ?EMRL P. Additive mappings preserving operators of rank one[J]. Linear Algebra and its Applications, 1993, 182:239-256. |
| [7] | HOU Jinchuan, CUI Jianlian. Additive maps on standard operator algebras preserving invertibilities or zero divisors[J]. Linear Algebra and its Applications, 2003, 359(1-3):219-233. |
