surjective การใช้

• Then is surjective if and only if is an open map.
• An order isomorphism can be characterized as a surjective order embedding.
• If is surjective, then has bounded inverse, denoted by.
• Any functor which is part of an equivalence is essentially surjective.
• Its covering families are jointly surjective families of 閠ale morphisms.
• But it is not invertible as it is not surjective.
• As a consequence, the map above induces a surjective homomorphism
• This is equivalent to being a surjective order-embedding.
• In general, the representation is neither injective nor surjective.
• An immediate corollary is that an injective cellular automaton must be surjective.
• The syntomic topology is generated by surjective syntomic morphisms of affine schemes.
• Dedekind finite naturally means that every injective self-map is also surjective.
• A partial function may be both injective and surjective.
• Particularly, if f is surjective, then it is a monoid homomorphism.
• Cubes " occasionally " have the surjective property in other above.
• The Frobenius morphism is not necessarily surjective, even when is a field.
• In some important cases, for example finite fields, ? is surjective.
• Let \ phi : G \ rightarrow G'be a surjective homomorphism.
• In differential geometry, a fibered manifold is surjective connection on fiber bundles.
• Which is however generally neither injective nor surjective.