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Definition of Isomorphic
1. Adjective. Having similar appearance but genetically different.
Category relationships: Biological Science, Biology
Partainyms: Isomorphism, Isomorphism
Derivative terms: Isomorphy
Definition of Isomorphic
1. a. Isomorphous.
2. a. Alike in form; exhibiting isomorphism.
Definition of Isomorphic
1. Adjective. (biology) having a similar structure to something that is not related genetically ¹
2. Adjective. (mathematics) related by an isomorphism ¹
¹ Source: wiktionary.com
Definition of Isomorphic
1. [adj]
Medical Definition of Isomorphic
1. Having the quality of isomorphism. Origin: Iso- + -morphous. Source: Websters Dictionary (01 Mar 1998)
Lexicographical Neighbors of Isomorphic
Literary usage of Isomorphic
Below you will find example usage of this term as found in modern and/or classical literature:
1. Theory and Applications of Finite Groups by George Abram Miller, Hans Frederick Blichfeldt, Leonard Eugene Dickson (1916)
"Simply isomorphic Groups. One of the most important and most difficult ...
If they are simply isomorphic they are identical as abstract groups and vice ..."
2. An Introduction to the Theory of Groups of Finite Order by Harold Hilton (1908)
"Here only one element of F corresponds to each element of G, and the order of G
is I times the order of F. G is said to be multiply isomorphic with F (or F ..."
3. Primitive Groups by William Albert Manning (1921)
"The necessary and sufficient condition that a group G be isomorphic to some ...
A Group isomorphic to the Symmetric Group. This last theorem can be well ..."
4. Linear Groups: With an Exposition of the Galois Field Theory by Leonard Eugene Dickson (1901)
"... isomorphic •with the simple group LF(4:,p"') and is of index tivo under the
second ... isomorphic with 0^5, p") and therefore (§ 172) of order ..."
5. Proceedings of the American Philosophical Society Held at Philadelphia for by American Philosophical Society (1898)
"Hence we need to consider only one of these three subgroups in connection with
the study of the intransitive substitution groups that are simply isomorphic ..."
6. Finite Collineation Groups: With an Introduction to the Theory of Groups of by Hans Frederik Blichfeldt (1917)
"ON THE TOTALITY OF NON-EQUIVALENT isomorphic GROUPS, §§ 95-99 95. The regular group.
We shall now consider the regular substitution group H (§47). ..."
7. Theory of Groups of Finite Order by William Burnside (1897)
"Two simply isomorphic groups are, abstractly considered, identical. In discussing
the properties of groups, some definite mode of representation is, ..."
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