Your search keyword '"Weak tangent"' showing total 6 results

1. ON THE HAUSDORFF DIMENSION OF MICROSETS.

Author

FRASER, JONATHAN M., HOWROYD, DOUGLAS C., KÄENMÄKI, ANTTI, and HAN YU

Subjects

*MAXIMA & minima, FRACTAL dimensions

Abstract

We investigate how the Hausdorff dimensions of microsets are related to the dimensions of the original set. It is known that the maximal dimension of a microset is the Assouad dimension of the set. We prove that the lower dimension can analogously be obtained as the minimal dimension of a microset. In particular, the maximum and minimum exist. We also show that for an arbitrary Fσ set Δ ⊆ [0, d] containing its infimum and supremum there is a compact set in [0, 1]d for which the set of Hausdorff dimensions attained by its microsets is exactly equal to the set Δ. Our work is motivated by the general programme of determining what geometric information about a set can be determined at the level of tangents. [ABSTRACT FROM AUTHOR]

Published

2019

2. Assouad type dimensions for self-affine sponges with a weak coordinate ordering condition.

Author

Howroyd, Douglas C.

Subjects

*MATHEMATICAL analysis, *FRACTALS, *FRACTAL analysis

Abstract

Recently self-affine sponges have been shown to be interesting counter-examples to several previously open problems. One class of recently studied sponges are Bedford-McMullen sponges with a weak coordinate ordering condition, that is, sponges with several coordinates having the same contraction ratio. The Assouad type dimensions of such sets cannot be calculated using the same formula as the regular Bedford-McMullen sponges. We calculate the Assouad type dimensions for such sponges and the more general Lalley-Gatzouras sponges with a weak coordinate ordering condition, discussing some of their more subtle details along the way. [ABSTRACT FROM AUTHOR]

Published

2019

3. Visible part of dominated self-affine sets in the plane

Author

Eino Rossi and Department of Mathematics and Statistics

Subjects

28A80, Plane (geometry), Mathematical analysis, Articles, weak tangent, Visible part, Set (abstract data type), Dimension (vector space), Projection (mathematics), Mathematics - Classical Analysis and ODEs, Classical Analysis and ODEs (math.CA), FOS: Mathematics, 111 Mathematics, self-affine, Limit (mathematics), Affine transformation, Mathematics

Abstract

The dimension of the visible part of self-affine sets, that satisfy domination and a projection condition, is being studied. The main result is that the assouad dimension of the visible part equals to 1 for all directions outside the set of limit directions of the cylinders of the self-affine set. The result holds regardless of the overlap of the cylinders. The sharpness of the result is also being discussed., Final draft. 13 pages and 1 figure

Published

2021

4. On the Hausdorff dimension of microsets

Author

Douglas C. Howroyd, Han Yu, Jonathan M. Fraser, Antti Käenmäki, The Leverhulme Trust, EPSRC, and University of St Andrews. Pure Mathematics

Subjects

Microset, General Mathematics, Dimension (graph theory), T-NDAS, Hausdorff dimension, 01 natural sciences, Combinatorics, Set (abstract data type), Weak tangent, Mathematics - Metric Geometry, 0103 physical sciences, FOS: Mathematics, QA Mathematics, 0101 mathematics, QA, Mathematics, Applied Mathematics, 010102 general mathematics, Hausdorff space, Tangent, Metric Geometry (math.MG), Infimum and supremum, 28A80 (Primary), 28A78 (Secondary), Compact space, Assouad type dimensions, 010307 mathematical physics

Abstract

We investigate how the Hausdorff dimensions of microsets are related to the dimensions of the original set. It is known that the maximal dimension of a microset is the Assouad dimension of the set. We prove that the lower dimension can analogously be obtained as the minimal dimension of a microset. In particular, the maximum and minimum exist. We also show that for an arbitrary $\mathcal{F}_\sigma$ set $\Delta \subseteq [0,d]$ containing its infimum and supremum there is a compact set in $[0,1]^d$ for which the set of Hausdorff dimensions attained by its microsets is exactly equal to the set $\Delta$. Our work is motivated by the general programme of determining what geometric information about a set can be determined at the level of tangents., Comment: 15 pages, 1 figure. small fixes

Published

2019

5. Arithmetic patches, weak tangents, and dimension

Author

Fraser, Jonathan MacDonald, Yu, Han, The Leverhulme Trust, and University of St Andrews. Pure Mathematics

Subjects

Arithmetic patch, Weak tangent, Erdös-Turán conjecture, Assouad dimension, T-NDAS, Arithmetic progression, Szemerédi’s Theorem, QA Mathematics, BDC, QA, Steinhaus property

Abstract

The first named author is supported by a Leverhulme Trust Research Fellowship (RF-2016-500) and the second named author is supported by a PhD scholarship provided bythe School of Mathematics in the University of St Andrews We investigate the relationships between several classical notions in arithmetic combinatorics and geometry including the presence (or lack of) arithmetic progressions (or patches in dimensions at least 2), the structure of tangent sets, and the Assouad dimension. We begin by extending a recent result of Dyatlov and Zahl by showing that a set cannot contain arbitrarily large arithmetic progressions (patches) if it has Assouad dimension strictly smaller than the ambient spatial dimension. Seeking a partial converse, we go on to prove that having Assouad dimension equal to the ambient spatial dimension is equivalent to having weak tangents with non-empty interior and to ‘asymptotically’ containing arbitrarily large arithmetic patches. We present some applications of our results concerning sets of integers, which include a weak solution to the Erdös–Turán conjecture on arithmetic progressions. Postprint

Published

2017

6. Distance sets, orthogonal projections, and passing to weak tangents

Author

Jonathan M. Fraser, The Leverhulme Trust, and University of St Andrews. Pure Mathematics

Subjects

Planar projection, Assouad dimension, General Mathematics, T-NDAS, 01 natural sciences, Set (abstract data type), Combinatorics, Weak tangent, Dimension (vector space), Mathematics - Metric Geometry, 0103 physical sciences, Classical Analysis and ODEs (math.CA), FOS: Mathematics, Mathematics::Metric Geometry, QA Mathematics, 0101 mathematics, QA, Mathematics, Orthogonal projection, Plane (geometry), 010102 general mathematics, Orthographic projection, Hausdorff space, Tangent, Metric Geometry (math.MG), Geometric measure theory, 28A80 (Primary), 28A78 (Secondary), Mathematics - Classical Analysis and ODEs, Exceptional set, Restricted families, 010307 mathematical physics, BDC, Distance set

Abstract

We consider the Assouad dimension analogues of two important problems in geometric measure theory. These problems are tied together by the common theme of `passing to weak tangents'. First, we solve an analogue of Falconer's distance set problem for Assouad dimension in the plane: if a planar set has Assouad dimension strictly greater than 1, then its distance set has Assouad dimension 1. We also obtain partial results in higher dimensions. Second, we consider how Assouad dimension behaves under orthogonal projection. We extend the planar projection theorem of Fraser and Orponen to higher dimensions, provide estimates on the (Hausdorff) dimension of the exceptional set of projections, and provide a recipe for obtaining results about restricted families of projections. We provide several illustrative examples throughout., Comment: 20 pages, corrected a typo in the statement of Theorem 2.10: one instance of min should have been a max

Published

2017