Compactness and Connectedness in Aura Topological Spaces
Abstract
This is the second paper in a series on aura topological spaces , where is a scope function with . We study covering and connectivity properties in this setting. Five compactness-type notions are defined (-compact, -Lindelof, countably -compact, -sequentially compact, -limit point compact) and their mutual relationships are determined. For transitive aura functions we obtain a concrete convergence criterion: converges to in if and only if eventually. We show that -compact subsets of - spaces are -closed and that -compactness is preserved under -continuous surjections. On the connectivity side, -connected, -path connected, and -locally connected spaces are introduced; -components are -closed, and they are -open when the space is -locally connected. We construct subspace and product aura topologies. For products the inclusion chain is established, with equality on the left when both scope functions are transitive. A Tychonoff-type theorem for transitive aura spaces is proved. All implications are shown to be strict by counterexamples.
Keywords
Cite
@article{arxiv.2602.07686,
title = {Compactness and Connectedness in Aura Topological Spaces},
author = {Ahu Acikgoz},
journal= {arXiv preprint arXiv:2602.07686},
year = {2026}
}
Comments
17 pages. Second paper in the Aura Topological Spaces series