Intermediate dimensions

Kenneth J. Falconer; Jonathan M. Fraser; Tom Kempton

doi:10.1007/s00209-019-02452-0

Intermediate dimensions

Kenneth J. Falconer, Jonathan M. Fraser^*, Tom Kempton

^*Corresponding author for this work

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

Abstract

We introduce a continuum of dimensions which are ‘intermediate’ between the familiar Hausdorff and box dimensions. This is done by restricting the families of allowable covers in the definition of Hausdorff dimension by insisting that | U| ≤ | V| ^θ for all sets U, V used in a particular cover, where θ∈ [0 , 1] is a parameter. Thus, when θ= 1 only covers using sets of the same size are allowable, and we recover the box dimensions, and when θ= 0 there are no restrictions, and we recover Hausdorff dimension. We investigate many properties of the intermediate dimension (as a function of θ), including proving that it is continuous on (0, 1] but not necessarily continuous at 0, as well as establishing appropriate analogues of the mass distribution principle, Frostman’s lemma, and the dimension formulae for products. We also compute, or estimate, the intermediate dimensions of some familiar sets, including sequences formed by negative powers of integers, and Bedford–McMullen carpets.

Original language	English
Journal	Mathematische Zeitschrift
Early online date	26 Dec 2019
DOIs	https://doi.org/10.1007/s00209-019-02452-0
Publication status	Published - 2019

Keywords

Box dimension
Hausdorff dimension
Self-affine carpet

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title = "Intermediate dimensions",

abstract = "We introduce a continuum of dimensions which are {\textquoteleft}intermediate{\textquoteright} between the familiar Hausdorff and box dimensions. This is done by restricting the families of allowable covers in the definition of Hausdorff dimension by insisting that | U| ≤ | V| θ for all sets U, V used in a particular cover, where θ∈ [0 , 1] is a parameter. Thus, when θ= 1 only covers using sets of the same size are allowable, and we recover the box dimensions, and when θ= 0 there are no restrictions, and we recover Hausdorff dimension. We investigate many properties of the intermediate dimension (as a function of θ), including proving that it is continuous on (0, 1] but not necessarily continuous at 0, as well as establishing appropriate analogues of the mass distribution principle, Frostman{\textquoteright}s lemma, and the dimension formulae for products. We also compute, or estimate, the intermediate dimensions of some familiar sets, including sequences formed by negative powers of integers, and Bedford–McMullen carpets.",

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T1 - Intermediate dimensions

AU - Falconer, Kenneth J.

AU - Fraser, Jonathan M.

AU - Kempton, Tom

PY - 2019

Y1 - 2019

N2 - We introduce a continuum of dimensions which are ‘intermediate’ between the familiar Hausdorff and box dimensions. This is done by restricting the families of allowable covers in the definition of Hausdorff dimension by insisting that | U| ≤ | V| θ for all sets U, V used in a particular cover, where θ∈ [0 , 1] is a parameter. Thus, when θ= 1 only covers using sets of the same size are allowable, and we recover the box dimensions, and when θ= 0 there are no restrictions, and we recover Hausdorff dimension. We investigate many properties of the intermediate dimension (as a function of θ), including proving that it is continuous on (0, 1] but not necessarily continuous at 0, as well as establishing appropriate analogues of the mass distribution principle, Frostman’s lemma, and the dimension formulae for products. We also compute, or estimate, the intermediate dimensions of some familiar sets, including sequences formed by negative powers of integers, and Bedford–McMullen carpets.

AB - We introduce a continuum of dimensions which are ‘intermediate’ between the familiar Hausdorff and box dimensions. This is done by restricting the families of allowable covers in the definition of Hausdorff dimension by insisting that | U| ≤ | V| θ for all sets U, V used in a particular cover, where θ∈ [0 , 1] is a parameter. Thus, when θ= 1 only covers using sets of the same size are allowable, and we recover the box dimensions, and when θ= 0 there are no restrictions, and we recover Hausdorff dimension. We investigate many properties of the intermediate dimension (as a function of θ), including proving that it is continuous on (0, 1] but not necessarily continuous at 0, as well as establishing appropriate analogues of the mass distribution principle, Frostman’s lemma, and the dimension formulae for products. We also compute, or estimate, the intermediate dimensions of some familiar sets, including sequences formed by negative powers of integers, and Bedford–McMullen carpets.

KW - Box dimension

KW - Hausdorff dimension

KW - Self-affine carpet

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DO - 10.1007/s00209-019-02452-0

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SN - 0025-5874

JO - Mathematische Zeitschrift

JF - Mathematische Zeitschrift

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Intermediate dimensions

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