A fundamental problem in the dimension theory of self-affine sets is the construction of high- dimensional measures which yield sharp lower bounds for the Hausdorff dimension of the set. A natural strategy for the construction of such high-dimensional measures is to investigate measures of maximal Lyapunov dimension; these measures can be alternatively interpreted as equilibrium states of the singular value function introduced by Falconer. Whilst the existence of these equilibrium states has been well-known for some years their structure has remained elusive, particularly in dimensions higher than two. In this article we give a complete description of the equilibrium states of the singular value function in the three-dimensional case, showi...
We obtain bounds for the generalized q-dimensions of measures supported by self-affine sets that ate...
Under certain conditions the 'singular value function' formula gives the Hausdorff dimension of self...
The authors were financially supported by an LMS Scheme 4 Research in Pairs grant. The second author...
A fundamental problem in the dimension theory of self-affine sets is the construction of high- dime...
We completely describe the equilibrium states of a class of potentials over the full shift which inc...
We study equilibrium measures (K ̈aenm ̈aki measures) supported on self-affine sets generated by a ...
Under mild conditions we show that the affinity dimension of a planar self-affine set is equal to t...
We prove that the upper box dimension of an inhomogeneous self-affine set is bounded above by the ma...
Let $X=\bigcup\varphi_i(X)$ be a strongly separated self-affine set in $\mathbb{R}^2$ (or one satisf...
In 1988 Falconer introduced a formula which predicts the value of the Hausdorff dimension of the att...
In this note we investigate some properties of equilibrium states of affine iterated function system...
In this thesis we study the dimension theory of self-affine sets. We begin by introducing a number o...
Using methods from ergodic theory along with properties of the Furstenberg measure we obtain conditi...
We study the Lq-dimensions of self-affine measures and the Käenmäki measure on a class of self-affin...
We study the dimension theory of a class of planar self-affine multifractal measures. These mea-sure...
We obtain bounds for the generalized q-dimensions of measures supported by self-affine sets that ate...
Under certain conditions the 'singular value function' formula gives the Hausdorff dimension of self...
The authors were financially supported by an LMS Scheme 4 Research in Pairs grant. The second author...
A fundamental problem in the dimension theory of self-affine sets is the construction of high- dime...
We completely describe the equilibrium states of a class of potentials over the full shift which inc...
We study equilibrium measures (K ̈aenm ̈aki measures) supported on self-affine sets generated by a ...
Under mild conditions we show that the affinity dimension of a planar self-affine set is equal to t...
We prove that the upper box dimension of an inhomogeneous self-affine set is bounded above by the ma...
Let $X=\bigcup\varphi_i(X)$ be a strongly separated self-affine set in $\mathbb{R}^2$ (or one satisf...
In 1988 Falconer introduced a formula which predicts the value of the Hausdorff dimension of the att...
In this note we investigate some properties of equilibrium states of affine iterated function system...
In this thesis we study the dimension theory of self-affine sets. We begin by introducing a number o...
Using methods from ergodic theory along with properties of the Furstenberg measure we obtain conditi...
We study the Lq-dimensions of self-affine measures and the Käenmäki measure on a class of self-affin...
We study the dimension theory of a class of planar self-affine multifractal measures. These mea-sure...
We obtain bounds for the generalized q-dimensions of measures supported by self-affine sets that ate...
Under certain conditions the 'singular value function' formula gives the Hausdorff dimension of self...
The authors were financially supported by an LMS Scheme 4 Research in Pairs grant. The second author...