homomorphism In A Sentence
Learn how to use homomorphism in a sentence and make better sentences with `homomorphism` by reading homomorphism sentence examples.
- A homomorphism that maps a mathematical set into itself.
- It is the kernel of the homomorphism sgn.
- The map from to sending to is an injective homomorphism of rings, by which is viewed as a subring of.
- Such a homomorphism ? is called a comultiplication if it satisfies certain axioms.
- The three classes of homomorphisms of implicative posemigroups are investigated. The three homomorphism theorems are established.
- The coefficients of the Kazhdan-Lusztig polynomials are conjectured to be the dimensions of some homomorphism spaces in Soergel's bimodule category.
- In the context of abstract algebra or universal algebra, a "'monomorphism "'is an injective homomorphism.
- We introduce the minimum cost graph homomorphism problem, provide partial results and pose an open problem.
- Any bijective ring homomorphism is a ring isomorphism.
- As a result, the pullback homomorphism makes sheaf cohomology with constant coefficients into a contravariant functor from topological spaces to abelian groups.
- I think this is a homomorphism g.
- Theand the anti - grouped ideal of BZ - algebra were introduced and the homomorphism theorem of BZ - algebras was proved.
- This construction can be seen as an instance of the universal property : this surjection is the unique group homomorphism which extends the function e _ x mapsto x.
- :Wouldn't an " isomorphism into " a group just be a monomorphism ( i . e . an injective homomorphism )?.
- Then there exists a unique homomorphism: G * K H F such that i = and j = .
- In this paper, the concept of natural homomorphism for graph is presented. Furthermore, the method of reducing information graph and keeping the capability of processing information is given.
- Constraint satisfaction and the homomorphism problem.
- The exponential function gives a sheaf homomorphism.
- The kernel of this homomorphism is the augmentation ideal of the algebra.
- A "'split epimorphism "'is an homomorphism that has a left inverse.
- Studying the condition about the natural partial order on it. And characterized the homomorphism between regular semigroups, discussing the conditions about the special homomorphism image.
- This is also an example of a ring homomorphism which is both a monomorphism and an epimorphism, but not an isomorphism.
- A ring homomorphism between the same ring is called an endomorphism and an isomorphism between the same ring an automorphism.
- The mapping is a ring homomorphism from the ring of limited hyperreals to.
- A bijective module homomorphism is an isomorphism of modules, and the two modules are called " isomorphic ".
- In particular, the natural homomorphism is a dependency morphism.
- Particularly, if f is surjective, then it is a monoid homomorphism.
- It seems like without knowing that the homomorphism is surjective, I can' t say too much.
- The homomorphism is clearly injective, but is surjective if and only if k is infinite.
- Moreover, every homomorphism between Lie algebras lifts to a unique homomorphism between the corresponding simply connected Lie groups.
- It is one of the earliest examples of a homomorphism.
- This is because a bijective homomorphism need not be an isomorphism of topological groups.
- The permutation group arising by the induced action is then the image of this operation homomorphism.
- The connecting homomorphism is therefore a generalized winding number and measures the failure of " U " to be contractible.
- The connecting homomorphism sends a line bundle to its first Chern class.
- The most used reformulation is that in terms of the homomorphism problem.
- However, the standard homomorphism may be zero in some cases.
- For sets and vector spaces, every monomorphism is a split homomorphism, but this property is wrong for most common algebraic structures.
- It's difficult to find homomorphism in a sentence.
- The kernel of a module homomorphism is the submodule of " M " consisting of all elements that are sent to zero by " f ".
- This homomorphism is given by the same formula as before, but it is not surjective in general.
- A torsionless module is one for which the canonical homomorphism is injective.
- In the language of abstract algebra, a linear map is a module homomorphism.
Similar words: Homunculus, Homemaking, Home Address, Homosexual, Homme, Homochlamydeous, Homeless Person, Homerton, Homoptera, Homoiousians, Homofermentative, Homological, Homeopaths, Homeopathic, Homosassa, Home State, Home School, Homebound, Homoeomery, Home Building