Projective and Non-Projective Varieties of Topological Decomposition of Groups with Embeddings

Abstract: In general, the group decompositions are formulated by employing automorphisms and semidirect products to determine continuity and compactification properties. This paper proposes a set of constructions of novel topological decompositions of groups and analyzes the behaviour of group actions under the topological decompositions. The proposed topological decompositions arise in two varieties, such as decomposition based on topological fibers without projections and decomposition in the presence of translated pr… Show more

“…Topological decompositions of group algebraic structures have varieties, and are an interesting topic with potential applications [3,17]. The topological decomposition of general group structures and associated embeddings in topological spaces are relatively new approaches without emphasizing the continuity criteria in group structures [18]. Alternatively, the concept of functionally generated groups attempts to incorporate continuity within the finite group structure.…”

“…First, the notion of the partition of a normal topological space is established as follows. Let (X, τ X ) be a topological space and the partition of the space is given by X = {A i ⊂ X : i ∈ I}, which is a family of subspaces [18]. It maintains the property as given below:…”

“…Next, a set of definitions related to embeddable topological decomposition of group algebraic structure is presented [18].…”

The Sequential and Contractible Topological Embeddings of Functional Groups

“…Topological decompositions of group algebraic structures have varieties, and are an interesting topic with potential applications [3,17]. The topological decomposition of general group structures and associated embeddings in topological spaces are relatively new approaches without emphasizing the continuity criteria in group structures [18]. Alternatively, the concept of functionally generated groups attempts to incorporate continuity within the finite group structure.…”

“…First, the notion of the partition of a normal topological space is established as follows. Let (X, τ X ) be a topological space and the partition of the space is given by X = {A i ⊂ X : i ∈ I}, which is a family of subspaces [18]. It maintains the property as given below:…”

“…Next, a set of definitions related to embeddable topological decomposition of group algebraic structure is presented [18].…”

The Sequential and Contractible Topological Embeddings of Functional Groups