topologiemapping

Topologiemapping is a term used to describe the construction and study of mappings between topological spaces that respect or reflect their topological structure. In mathematics, the most fundamental notion is continuity: a map f: X -> Y between topological spaces is continuous if the preimage of every open set in Y is open in X. More restrictive or specialized notions include embeddings (injective continuous maps whose image carries the subspace topology), homeomorphisms (bijective maps with continuous inverse), quotient maps (which identify points to form a new topology), and covering maps (maps that locally look like a product).

Beyond basic continuity, topologiemapping also encompasses maps that preserve other invariants, such as connectedness, compactness, or

Applications of topologiemapping include geometric modeling, computer graphics, geographic information systems, and topological data analysis, where