isomorphic

In mathematics|lang=en terms the difference between isomorphic and homogeneous

is that isomorphic is (mathematics) related by an isomorphism; having a structure-preserving one-to-one correspondence while homogeneous is (mathematics) of which the properties of a smaller set apply to the whole; scalable.

As adjectives the difference between isomorphic and homogeneous

is that isomorphic is (mathematics) related by an isomorphism; having a structure-preserving one-to-one correspondence while homogeneous is of the same kind; alike, similar.

As an adjective isomorphic

is (mathematics) related by an isomorphism; having a structure-preserving one-to-one correspondence.

As a noun homogeneity is

the state or quality of being homogeneous.

Isomorphous is a related term of isomorphic.

As adjectives the difference between isomorphic and isomorphous

is that isomorphic is related by an isomorphism; having a structure-preserving one-to-one correspondence while isomorphous is of, relating to, or exhibiting isomorphism.

As a noun isomorph

is anything that exhibits isomorphism.

As an adjective isomorphic is

(mathematics) related by an isomorphism; having a structure-preserving one-to-one correspondence.

As an adjective isomorphic

is (mathematics) related by an isomorphism; having a structure-preserving one-to-one correspondence.

As a noun graph is

graph or graph can be a symbol as the smallest unit in a text which has not yet been classified as a grapheme.

Heteromorphic is a coordinate term of isomorphic.

In biology terms the difference between isomorphic and heteromorphic

is that isomorphic is having a similar structure or function to something that is not related genetically or through evolution while heteromorphic is having different forms in different stages of the life cycle.

As adjectives the difference between isomorphic and heteromorphic

is that isomorphic is related by an isomorphism; having a structure-preserving one-to-one correspondence while heteromorphic is having different forms in different stages of the life cycle.

In mathematics terms the difference between isomorphic and homological

is that isomorphic is related by an isomorphism; having a structure-preserving one-to-one correspondence while homological is having to do with homology.

In biology terms the difference between isomorphic and homological

is that isomorphic is having a similar structure or function to something that is not related genetically or through evolution while homological is having a similar evolutionary origin; homologous.

Homomorphic is a coordinate term of isomorphic.

As adjectives the difference between isomorphic and homomorphic

is that isomorphic is related by an isomorphism; having a structure-preserving one-to-one correspondence while homomorphic is of or pertaining to homomorphism; having a homomorphism.

As an adjective isomorphic

is related by an isomorphism; having a structure-preserving one-to-one correspondence.

As a noun subobject is

given an object B, a subobject of it is an equivalence class of objects $A\_i$ which relate to B through monomorphisms $m\_i\; :\; A\_i\; \backslash rightarrow\; B$. (If a pair of monomorphisms with codomain B factor through each other, then their domains are isomorphic and thus belong to an equivalence class which defines a subobject of B). The subobject generalizes its interpretation in category Set as a set which is a subset (though an inclusion map, which is a monomorphism) of another set.