| Popis: |
In this paper, we introduce a novel structure of stratified L-convex groups, defined as groups equipped with a stratified L-convex space, ensuring that the group operation is an L-convexity-preserving mapping. We prove that stratified L-convex groups serve as objects, while L-convexity-preserving group homomorphisms as morphisms, together forming a concrete category, denoted as SLCG. As a specific instance of SLCG (i.e., when L=2), we define the category of convex groups, denoted as CG. We demonstrate that SLCG possesses well-defined characterizations, localization properties, as well as initial and final structures, establishing it as a topological category over groups. Additionally, we show that CG can be embedded within SLCG as a reflective subcategory. |
