We characterise rectifiable subsets of a complete metric space X in terms of local approximation, with respect to the Gromov--Hausdorff distance, by an n-dimensional Banach space. In fact, if E⊂X with Hn(E)<∞ and has positive lower density almost everywhere, we prove that it is sufficient that, at almost every point and each sufficiently small scale, E is approximated by a bi-Lipschitz image of Euclidean space. We also introduce a generalisation of Preiss's tangent measures that is suitable for the setting of arbitrary metric spaces and formulate our characterisation in terms of tangent measures. This definition is equivalent to that of Preiss when the ambient space is Euclidean, and equivalent to the measured Gromov-Hausdorff tangent spac...
We prove a structure theorem for any $n$-rectifiable set $E\subset\mathbb{R}^{n+1}, n \geq 1$, satis...
In this thesis, we examine the geometry of fractals and metric spaces. We study the ...
We prove the equivalence of two seemingly very different ways of generalising Rademacher's theorem t...
We characterise rectifiable subsets of a complete metric space $X$ in terms of local approximation, ...
We characterise purely n-unrectifiable subsets S of a complete metric space X with finite Hausdorff ...
In this dissertation we study Lipschitz and bi-Lipschitz mappings on abstract, non-smooth metric mea...
We define rectifiability in Rn × R with a parabolic metric in terms of C1 graphs and Lipschitz graph...
We prove that a metric measure space (X,d,m) satisfying finite dimensional lower Ricci curvature bou...
We characterize uniformly perfect, complete, doubling metric spaces which embed bi-Lipschitzly into ...
Abstract. We study Lipschitz differentiability spaces, a class of metric measure spaces introduced b...
We find necessary and sufficient conditions for a Lipschitz map f : E Rk ! X into a metric space to ...
We study the existence of tangent lines, i.e. subsets of the tangent space isometric to the real lin...
When does a metric space admit a bilipschitz embedding into some finite-dimensional Euclidean space?...
We give a sufficient condition for a general compact metric space to admit an n-rectifiable piece, a...
A major theme in geometric measure theory is establishing global properties, such as rectifiability,...
We prove a structure theorem for any $n$-rectifiable set $E\subset\mathbb{R}^{n+1}, n \geq 1$, satis...
In this thesis, we examine the geometry of fractals and metric spaces. We study the ...
We prove the equivalence of two seemingly very different ways of generalising Rademacher's theorem t...
We characterise rectifiable subsets of a complete metric space $X$ in terms of local approximation, ...
We characterise purely n-unrectifiable subsets S of a complete metric space X with finite Hausdorff ...
In this dissertation we study Lipschitz and bi-Lipschitz mappings on abstract, non-smooth metric mea...
We define rectifiability in Rn × R with a parabolic metric in terms of C1 graphs and Lipschitz graph...
We prove that a metric measure space (X,d,m) satisfying finite dimensional lower Ricci curvature bou...
We characterize uniformly perfect, complete, doubling metric spaces which embed bi-Lipschitzly into ...
Abstract. We study Lipschitz differentiability spaces, a class of metric measure spaces introduced b...
We find necessary and sufficient conditions for a Lipschitz map f : E Rk ! X into a metric space to ...
We study the existence of tangent lines, i.e. subsets of the tangent space isometric to the real lin...
When does a metric space admit a bilipschitz embedding into some finite-dimensional Euclidean space?...
We give a sufficient condition for a general compact metric space to admit an n-rectifiable piece, a...
A major theme in geometric measure theory is establishing global properties, such as rectifiability,...
We prove a structure theorem for any $n$-rectifiable set $E\subset\mathbb{R}^{n+1}, n \geq 1$, satis...
In this thesis, we examine the geometry of fractals and metric spaces. We study the ...
We prove the equivalence of two seemingly very different ways of generalising Rademacher's theorem t...