Isomorphism of covering spaces refers to a relation between two covering spaces that allows for a structure-preserving bijective mapping between them. This concept is crucial when classifying covering spaces, as it identifies when two coverings can be considered essentially the same in terms of their topological properties, regardless of their specific representation. By understanding these isomorphisms, one can group covering spaces into equivalence classes that share common characteristics.
congrats on reading the definition of Isomorphism of Covering Spaces. now let's actually learn it.