Title of article
Perfect images of absolute Souslin and absolute Borel Tychonoff spaces
Author/Authors
Bernard H. Holicky، نويسنده , , Petr and Spurn?، نويسنده , , Ji??́، نويسنده ,
Issue Information
دوماهنامه با شماره پیاپی سال 2003
Pages
14
From page
281
To page
294
Abstract
The perfect image of a Tychonoff space X that is a result of the Souslin operation applied to the resolvable sets of F. Hausdorff (called also H-sets) in any Tychonoff space containing X is of the same descriptive type. This answers a question of R.W. Hansell since, within Tychonoff spaces, it says that perfect mappings preserve scattered-K-analytic spaces. We get also a new proof of an analogous fact for Čech-analytic spaces that was proved already by R.W. Hansell and S. Pan using another method. We show that various absolute Borel classes are preserved by perfect mappings generalizing a result of J.E. Jayne and C.A. Rogers who proved the same fact within metric spaces. In fact, more general absolute descriptive classes and their stability with respect to perfect mappings are investigated.
Keywords
Borel sets , Analytic spaces , Perfect mapping , Souslin operation
Journal title
Topology and its Applications
Serial Year
2003
Journal title
Topology and its Applications
Record number
1580374
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