Metric axioms: a structural study
Abstract
For a fixed set , an arbitrary \textit{weight structure} can be interpreted as a distance assignment between pairs of points on . Restrictions (i.e. \textit{metric axioms}) on the behaviour of any such naturally arise, such as separation, triangle inequality and symmetry. We present an order-theoretic investigation of various collections of weight structures, as naturally occurring subsets of satisfying certain metric axioms. Furthermore, we exploit the categorical notion of adjunctions when investigating connections between the above collections of weight structures. As a corollary, we present several lattice-embeddability theorems on a well-known collection of weight structures on .
Cite
@article{arxiv.1311.0297,
title = {Metric axioms: a structural study},
author = {Jorge Bruno and Ittay Weiss},
journal= {arXiv preprint arXiv:1311.0297},
year = {2014}
}
Comments
Lattices, Embeddings, Metric axioms, Topology, first-order language, adjoints, adjunctions