Homomorphism vs Indicable - What's the difference?
homomorphism | indicable |
(algebra) A structure-preserving map between two algebraic structures, such as groups, rings, or vector spaces.
(biology) A similar appearance of two unrelated organisms or structures
(mathematics, of a group) Such that there exists a homomorphism from it to .
As a noun homomorphism
is (algebra) a structure-preserving map between two algebraic structures, such as groups, rings, or vector spaces.As an adjective indicable is
(mathematics|of a group) such that there exists a homomorphism from it to or indicable can be that can be indexed or indicable can be indictable or indicable can be indicatable.homomorphism
English
Noun
(en noun)- A field homomorphism is a map from one field to another one which is additive, multiplicative, zero-preserving, and unit-preserving.