On dimensionally exotic maps

Alexander Dranishnikov; Michael Levin

doi:10.1007/s11856-014-1056-5

On dimensionally exotic maps

Alexander Dranishnikov
, Michael Levin

Department of Mathematics

Research output: Contribution to journal › Article › peer-review

1 Scopus citations

Abstract

We call a value y = f(x) of a map f: X → Y dimensionally regular if dimX ≤ dim(Y × f⁻¹(y)). It was shown in [6] that if a map f: X → Y between compact metric spaces does not have dimensionally regular values, then X is a Boltyanskii compactum, i.e., a compactum satisfying the equality dim(X × X) = 2dim X − 1. In this paper we prove that every Boltyanskii compactum X of dimension dim X ≥ 6 admits a map f: X → Y without dimensionally regular values. We show that the converse does not hold by constructing a 4-dimensional Boltyanskii compactum for which every map has a dimensionally regular value.

Original language	English
Pages (from-to)	967-987
Number of pages	21
Journal	Israel Journal of Mathematics
Volume	201
Issue number	2
DOIs	https://doi.org/10.1007/s11856-014-1056-5
State	Published - 2 Oct 2014

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General Mathematics

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title = "On dimensionally exotic maps",

abstract = "We call a value y = f(x) of a map f: X → Y dimensionally regular if dimX ≤ dim(Y × f−1(y)). It was shown in [6] that if a map f: X → Y between compact metric spaces does not have dimensionally regular values, then X is a Boltyanskii compactum, i.e., a compactum satisfying the equality dim(X × X) = 2dim X − 1. In this paper we prove that every Boltyanskii compactum X of dimension dim X ≥ 6 admits a map f: X → Y without dimensionally regular values. We show that the converse does not hold by constructing a 4-dimensional Boltyanskii compactum for which every map has a dimensionally regular value.",

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N2 - We call a value y = f(x) of a map f: X → Y dimensionally regular if dimX ≤ dim(Y × f−1(y)). It was shown in [6] that if a map f: X → Y between compact metric spaces does not have dimensionally regular values, then X is a Boltyanskii compactum, i.e., a compactum satisfying the equality dim(X × X) = 2dim X − 1. In this paper we prove that every Boltyanskii compactum X of dimension dim X ≥ 6 admits a map f: X → Y without dimensionally regular values. We show that the converse does not hold by constructing a 4-dimensional Boltyanskii compactum for which every map has a dimensionally regular value.

AB - We call a value y = f(x) of a map f: X → Y dimensionally regular if dimX ≤ dim(Y × f−1(y)). It was shown in [6] that if a map f: X → Y between compact metric spaces does not have dimensionally regular values, then X is a Boltyanskii compactum, i.e., a compactum satisfying the equality dim(X × X) = 2dim X − 1. In this paper we prove that every Boltyanskii compactum X of dimension dim X ≥ 6 admits a map f: X → Y without dimensionally regular values. We show that the converse does not hold by constructing a 4-dimensional Boltyanskii compactum for which every map has a dimensionally regular value.

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On dimensionally exotic maps

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