关于Gul 'ko-Khmyleva同胚的有限支持性质

IF 0.3 Q4 MECHANICS

Vestnik Tomskogo Gosudarstvennogo Universiteta-Matematika i Mekhanika-Tomsk State University Journal of Mathematics and Mechanics Pub Date : 2023-01-01 DOI:10.17223/19988621/80/1

Valeriya S. Ametova, Vadim Lazarev

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引用次数: 0

摘要

建立了S.P. Gulko和T.E. Khmylyov构造的空间c0和s × c0的同胚，在伴随映射下第一坐标泛函的像没有有限支持。因此，我们看到这个同胚不具有有限支持性质。此外，还证明了其它所有坐标函数在伴随映射下的像都有有限的支撑。作者感谢S.P. Gubko和T.E. Khmyleva以及A.V. Osipov对这项工作的关注。作者感谢S.P. Gubko和T.E. Khmyleva以及A.V. Osipov对这项工作的关注。

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On the finite support property of Gul’ko-Khmyleva’s homeomorphism

It is established that for the homeomorphism of the spaces c0 and s × c0 constructed by S.P. Gulko and T.E. Khmylyov, the image of the first coordinate functional under the adjoint mapping has no finite support. As a consequence, we see that this homeomorphism does not have the finite support property. In addition, it is shown that the images of all other coordinate functionals under the adjoint mapping have finite supports. The authors thank S.P. Gubko and T.E. Khmyleva, as well as A.V. Osipov for their kind attention to this work. The authors thank S.P. Gubko and T.E. Khmyleva, as well as A.V. Osipov for their kind attention to this work.

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来源期刊

Vestnik Tomskogo Gosudarstvennogo Universiteta-Matematika i Mekhanika-Tomsk State University Journal of Mathematics and Mechanics MECHANICS-

CiteScore

0.90

自引率

66.70%

发文量