Papers
Topics
Authors
Recent
Search
2000 character limit reached

Unifying large scale and small scale geometry

Published 24 Mar 2018 in math.MG, math.GN, and math.GT | (1803.09154v2)

Abstract: A topology on a set $X$ is the same as a projection (i.e. an idempotent linear operator) $cl:2X\to 2X$ satisfying $A\subset cl(A)$ for all $A\subset X$. That's a good way to summarize Kuratowski's closure operator. Basic geometry on a set $X$ is a dot product $\cdot:2X\times 2X\to 2Y$. Its equivalent form is an orthogonality relation on subsets of $X$. The optimal case is if the orthogonality relation satisfies a variant of parallel-perpendicular decomposition from linear algebra. We show that this concept unifies small scale (topology, proximity spaces, uniform spaces) and large scale (coarse spaces, large scale spaces). Using orthogonality relations we define large scale compactifications that generalize all well-known compactifications: Higson corona, Gromov boundary, \v{C}ech-Stone compactification, Samuel-Smirnov compactification, and Freudenthal compactification.

Authors (1)

Summary

No one has generated a summary of this paper yet.

Paper to Video (Beta)

No one has generated a video about this paper yet.

Whiteboard

No one has generated a whiteboard explanation for this paper yet.

Open Problems

We haven't generated a list of open problems mentioned in this paper yet.

Continue Learning

We haven't generated follow-up questions for this paper yet.

Collections

Sign up for free to add this paper to one or more collections.