homomorphism of groups造句
例句与造句
- A homomorphism of group schemes is a map of schemes that respects multiplication.
- Again we recover the definition above of a homomorphism of groups with operators ( with " f " the component of the natural transformation ).
- This is equivalent to the above notion, as every dense morphism between two abelian varieties of the same dimension is automatically surjective with finite fibres, and if it preserves identities then it is a homomorphism of groups.
- Now, the morphisms of "'Top "'are continuous functions, so if f : X \ to Y is a continuous map of topological spaces, it can be extended to a homomorphism of groups
- Namely \ varphi is universal for homomorphisms from G to an abelian group H : for any abelian group H and homomorphism of groups f : G \ to H there exists a unique homomorphism F : G ^ { \ operatorname { ab } } \ to H such that f = F \ circ \ varphi.
- It's difficult to find homomorphism of groups in a sentence. 用homomorphism of groups造句挺难的