Examples of 'isomorphic' in a sentence
Meaning of "isomorphic"
When 'isomorphic' is used as an adjective, it describes objects or systems that have a similar structure or shape, particularly in mathematics or biology
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- Related by an isomorphism; having a structure-preserving one-to-one correspondence.
- Having a similar structure or function to something that is not related genetically or through evolution.
- Having identical relevant structure; being structure-preserving while undergoing certain invertible transformations.
How to use "isomorphic" in a sentence
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isomorphic
Isomorphic semigroups have the same structure.
And give rise to isomorphic normed spaces.
All finite fields of a given order are isomorphic.
Every group is isomorphic to a quotient of a free group.
Each of these displays interesting isomorphic analogies.
They are an isomorphic copy of the complex numbers.
Determine if two graphs have isomorphic subgraphs.
Any triangle isomorphic to a distinguished triangle is distinguished.
Determine whether two vector spaces are isomorphic.
Two graphs and are isomorphic if and only if.
Prove that any two coproducts are isomorphic.
Every subordering is isomorphic to an initial segment.
How to show two groups are isomorphic.
Mutually isomorphic spaces are thought of as copies of a single space.
Victor can verify that they are indeed isomorphic.
See also
A category is called skeletal if isomorphic objects are necessarily identical.
Isomorphic JavaScript is another popular approach.
Thus these are isomorphic combinatorial classes.
Eliminate any node whose two children are isomorphic.
Every group is isomorphic to a group of permutations.
Two representations with the same character are isomorphic.
This construction must be isomorphic to the structure of intelligence.
It asks whether two graphs are isomorphic.
Isomorphic bipartite graphs have the same degree sequence.
If y is nuclear then the isotope by y is isomorphic to the original.
They are isomorphic to one another.
Every field with p elements is isomorphic to this one.
It uses an isomorphic approach and can also manage a store.
Tonnetz aligned with the notes of an isomorphic keyboard.
This is opposite to the isomorphic substitution we have been previously discussing.
Conclude that the graphs are isomorphic.
Two mathematical objects are isomorphic if an isomorphism exists between them.
Show that they are not isomorphic.
Isomorphic group therapy.
And those three series are isomorphic to one another.
We are therefore assured that those two solutions are isomorphic.
The volume id must be isomorphic to a grid.
Posets are equivalent to one another if and only if they are isomorphic.
Every finite abelian group is isomorphic to a direct product.
A set of graphs isomorphic to each other is called an isomorphism class of graphs.
The almost split sequences are isomorphic to.
Two isomorphic graphs.
Two graphs that are not isomorphic.
Influence of isomorphic substitution.
We say that these groups are isomorphic.
Taubes has shown that it is isomorphic to embedded contact homology.
You see that these trees are really isomorphic.
Every finitely generated group is isomorphic to a quotient of a free group.
How to determine if two graphs are not isomorphic.
Single function isomorphic response.
