PlanetPhysics/Locally Compact Hausdorff Spaces

Locally compact Hausdorff spaces[edit | edit source]

Definition[edit | edit source]

A locally compact Hausdorff space ${\displaystyle H_{LC}}$ is a locally compact topological space ${\displaystyle (X_{LC},\tau )}$ with ${\displaystyle \tau }$ being a Hausdorff topology, that is, if given any distinct points ${\displaystyle x,y\in X_{LC}}$, there exist disjoint sets ${\displaystyle U,V\in \tau }$ such that, ${\displaystyle U\cap V=\emptyset }$ (that is, open sets), and with ${\displaystyle x}$ and ${\displaystyle y}$ satisfying the conditions that ${\displaystyle x\in U}$ and ${\displaystyle y\in V}$.

Remark[edit | edit source]

An important, related concept to the locally compact Hausdorff space is that of a locally compact (topological) groupoid, which is a major concept for realizing extended quantum symmetries in terms of quantum groupoid representations in: Quantum Algebraic Topology (QAT), topological QFT (TQFT), algebraic QFT (AQFT), axiomatic QFT, QCG, and quantum gravity (QG). This has also prompted the relatively recent development of the concepts of homotopy 2-groupoid and homotopy double groupoid of a Hausdorff space ^[1][2]. It would be interesting to have also axiomatic definitions of these two important algebraic topology concepts that are consistent with the T2 axiom.

All Sources[edit | edit source]

^{[1] [2]}

References[edit | edit source]

1. ↑ ^{1.0 1.1} K.A. Hardie, K.H. Kamps and R.W. Kieboom., A homotopy 2-groupoid of a Hausdorff space, Applied Cat. Structures , 8 (2000): 209-234.
2. ↑ ^{2.0 2.1} R. Brown, K.A. Hardie, K.H. Kamps and T. Porter, A homotopy double groupoid of a Hausdorff space, {\it Theory and Applications of Categories} 10 ,(2002): 71-93.