Finite metric subsets of Banach spaces

Kilbane, James

January 2019

The central idea in this thesis is the introduction of a new isometric invariant of a Banach space. This is Property AI-I. A Banach space has Property AI-I if whenever a finite metric space almost-isometrically embeds into the space, it isometrically embeds. To study this property we introduce two further properties that can be thought of as finite metric variants of Dvoretzky's Theorem and Krivine's Theorem. We say that a Banach space satisfies the Finite Isometric Dvoretzky Property (FIDP) if it contains every finite subset of $\ell_2$ isometrically. We say that a Banach space has the Finite Isometric Krivine Property (FIKP) if whenever $\ell_p$ is finitely representable in the space then it contains every subset of $\ell_p$ isometrically. We show that every infinite-dimensional Banach space \emph{nearly} has FIDP and every Banach space nearly has FIKP. We then use convexity arguments to demonstrate that not every Banach space has FIKP, and thus we can exhibit classes of Banach spaces that fail to have Property AI-I. The methods used break down when one attempts to prove that there is a Banach space without FIDP and we conjecture that every infinite-dimensional Banach space has Property FIDP.

On the effect of asymmetry and dimension on computational geometric problems

Sridhar, Vijay, Sridhar

07 November 2018

No description available.

Computer Science

Metric-Embeddings

Quasimetrics

Random-Embeddings

Treewidth

Directed Sparsest-Cut

Directed Multi-Cut

Fractal-Dimension

Exact-Algorithms

Fixed-Parameter-Tractability

Approximation- Schemes

Spanners

Lower-Bounds

Exponential-Time-Hypothesis