Connection blocking in homogeneous spaces and nilmanifolds

Eugene Gutkin

arXiv:1211.7291·math.DG·January 14, 2013·2 cites

Connection blocking in homogeneous spaces and nilmanifolds

Eugene Gutkin

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TL;DR

This paper investigates the concept of connection blocking in homogeneous spaces, specifically proving that nilmanifolds are the only finite-volume spaces where every pair of points can be blocked, supporting the conjecture related to tori.

Contribution

The paper proves that nilmanifolds are the only finite-volume homogeneous spaces where all point pairs are blockable, confirming a conjecture for this class of spaces.

Findings

01

Nilmanifolds are blockable spaces.

02

Supports the conjecture that only tori are blockable among finite-volume homogeneous spaces.

03

Provides a proof for the case of nilmanifolds.

Abstract

Let $G$ be a connected Lie group acting locally simply transitively on a manifold $M$ . By connecting curves in $M$ we mean the orbits of one-parameter subgroups of $G$ . To block a pair of points $m_{1}, m_{2} \in M$ is to find a finite set $B \subset M ∖ m_{1}, m_{2}$ such that every connecting curve joining $m_{1}$ and $m_{2}$ intersects $B$ . The homogeneous space $M$ is blockable if every pair of points in $M$ can be blocked. Motivated by the geodesic security [4], we conjecture that the only blockable homogeneous spaces of finite volume are the tori. Here we establish the conjecture for nilmanifolds.

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Taxonomy

TopicsGeometry and complex manifolds · Geometric and Algebraic Topology · Advanced Algebra and Geometry