autohomomorfismeja

Autohomomorfismeja are mappings from a set to itself that preserve a certain structure. The specific structure being preserved depends on the context in which the term "autohomomorfismi" is used. In abstract algebra, an autohomomorphism is an endomorphism of an algebraic structure that is also an isomorphism. This means it is a function from the structure to itself that respects the operations of the structure and is both injective and surjective. For example, in the context of groups, a group autohomomorphism is a bijective homomorphism from a group to itself.

The concept of autohomomorphisms can be generalized to various algebraic structures, including rings, modules, vector spaces,

More broadly, the term "autohomomorfismi" might be used in other mathematical or theoretical contexts to refer