Constructions of some non-\(\sigma\)-porous sets on the real line (Q1068971)
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scientific article; zbMATH DE number 3931321
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | Constructions of some non-\(\sigma\)-porous sets on the real line |
scientific article; zbMATH DE number 3931321 |
Statements
Constructions of some non-\(\sigma\)-porous sets on the real line (English)
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1984
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It is well known that the \(\sigma\)-ideal A of sets which are of measure zero and of the first category has the properties: (i) if a Borel set S does not belong to A, the \(S+S\) contains an interval, (ii) each disjoint family of Borel sets not belonging to A is countable. In this paper there is given a general method of construction of perfect non-\(\sigma\)-porous sets and is shown that the \(\sigma\)-ideal of \(\sigma\)-porous sets has neither of the properties (i) or (ii) even for perfect sets. Special enveloping property of \(\sigma\)-porous sets is given.
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Borel set
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construction of perfect non-\(\sigma \) -porous sets
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