Examples of 'isomorphism' in a sentence
Meaning of "isomorphism"
Isomorphism is a term used in mathematics and computer science to describe a mapping between two mathematical structures that preserves their relationships
Show more definitions
- Similarity of form
- the similarity in form of organisms, which may be due to convergent evolution or shared genetic background, e.g. an algae species in which the haploid and diploid life stages are indistinguishable based on morphology.
- the similarity in the crystal structures of similar chemical compounds
- the similarity in the structure or processes of different organizations
How to use "isomorphism" in a sentence
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isomorphism
A canonical isomorphism is a canonical map that is an isomorphism.
The inverse g is also an isomorphism with inverse f.
An isomorphism of super vector spaces is a bijective homomorphism.
A plane duality which is an isomorphism is called a correlation.
An isomorphism is an morphism which has an inverse morphism.
A bijection implies isomorphism in the category of sets.
An isomorphism between vector spaces is a linear bijection.
A bijective monoid homomorphism is called a monoid isomorphism.
Uniqueness up to isomorphism is specified by the universal property.
A groupoid is a category in which every morphism is an isomorphism.
The inverse isomorphism can be constructed as follows.
The universal covering graph is unique up to isomorphism.
If there is an isomorphism from one to the other.
Any bijective ring homomorphism is a ring isomorphism.
A group automorphism is a group isomorphism from a group to itself.
See also
Isomorphism of equal dimension vector spaces.
See quotient group and isomorphism theorem.
An isomorphism between uniform spaces is called a uniform isomorphism.
Schooling around the world showing isomorphism.
The inverse of a ring isomorphism is also a ring isomorphism.
A line of shadow between osmosis and isomorphism.
An automorphism is an isomorphism whose source and target coincide.
To determine if two graphs have isomorphism or not.
A ring isomorphism is a bijective ring morphism.
The proof of the other isomorphism is similar.
Why isomorphism does not apply to JavaScript.
A ring automorphism is a ring isomorphism from a ring to itself.
The isomorphism can be performed by a suitable stereographic projection.
These can therefore serve as isomorphism invariants of graphs.
An isomorphism from a set onto itself.
This clearly induces an isomorphism on all homology groups.
Isomorphism between the models is besides the point.
Showing the isomorphism of two graphs.
Achieve homogeneity through competitive and institutional isomorphism.
The other isomorphism is proved similarly.
The diagram above commutes if and only if f is an isomorphism.
Test the isomorphism of two graphs.
An automorphism is a morphism that is both an endomorphism and an isomorphism.
Be aware that there is a isomorphism between the two.
The isomorphism holds if and only if there are terms.
A morphism that is invertible in this sense is called an isomorphism.
An isomorphism is a transformation between two sets.
An endomorphism that is also an isomorphism is automorphism.
On the isomorphism of a group within itself.
Representation theory therefore seeks to classify representations up to isomorphism.
The perception of an isomorphism between two known structures is a.
It can be shown that τγ is a linear isomorphism.
An isomorphism is simply a bijective homomorphism.
If f is proper then this map is an isomorphism.
A linear map is an isomorphism if and only if the determinant is nonzero.
