Compactness and Connectedness in Aura Topological Spaces

Abstract

This is the second paper in a series on aura topological spaces (X, τ, a), where a: X τ is a scope function with x ∈ a(x). We study covering and connectivity properties in this setting. Five compactness-type notions are defined (a-compact, a-Lindelof, countably a-compact, a-sequentially compact, a-limit point compact) and their mutual relationships are determined. For transitive aura functions we obtain a concrete convergence criterion: (xn) converges to x in τa if and only if xn ∈ a(x) eventually. We show that a-compact subsets of a-T2 spaces are a-closed and that a-compactness is preserved under a-continuous surjections. On the connectivity side, a-connected, a-path connected, and a-locally connected spaces are introduced; a-components are a-closed, and they are a-open when the space is a-locally connected. We construct subspace and product aura topologies. For products the inclusion chain (τa) × (τb) ⊂eq τa × b ⊂eq τX × τY 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.