Abstract
The interactions between topological covering spaces, homotopy and group structures in a fibered space exhibit an array of interesting properties. This paper proposes the formulation of finite covering space components of compact Lindelof variety in topological (C, R) spaces. The covering spaces form a Noetherian structure under topological injective embeddings. The locally path-connected components of covering spaces establish a set of finite topological groups, maintaining group homomorphism. The homeomorphic topological embedding of covering spaces and base space into a fibered non-compact topological (C, R) space generates two classes of fibers based on the location of identity elements of homomorphic groups. A compact general fiber gives rise to the discrete variety of fundamental groups in the embedded covering subspace. The path-homotopy equivalence is admitted by multiple identity fibers if, and only if, the group homomorphism is preserved in homeomorphic topological embeddings. A single identity fiber maintains the path-homotopy equivalence in the discrete fundamental group. If the fiber is an identity-rigid variety, then the fiber-restricted finite and symmetric translations within the embedded covering space successfully admits path-homotopy equivalence involving kernel. The topological projections on a component and formation of 2-simplex in fibered compact covering space embeddings generate a prime order cyclic group. Interestingly, the finite translations of the 2-simplexes in a dense covering subspace assist in determining the simple connectedness of the covering space components, and preserves cyclic group structure.
Highlights
The structures and properties of topological covering space Co of any arbitrary base space X have been studied in detail by Lubkin [1]
The groups can be equipped with homomorphism and the corresponding finite Noetherian covering spaces formed by homeomorphic embeddings allowtable the formulation of various path-homotopy equivalences in the fibered topological (C, R) space
The interplay of finite homomorphic groups in the path-connected components of covering spaces and the topological fibers generates a discrete variety of fundamental group structure within the embedded dense subspaces
Summary
The structures and properties of topological covering space Co of any arbitrary base space X have been studied in detail by Lubkin [1]. If the local connectedness of the topological space is further relaxed ∀B ⊂ X such that the covering space p−1(B) may not be uniquely determined, and as a result the suitable decomposition is necessary where p−1(B) = i∈∪ΛUi condition is preserved (Note that Λ denotes an index set and each Ui is open). In another extreme let us consider the compactopen topology in the spaces of continuous functions represented by Cf (X, Y) between the topological spaces X, Y.
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