- isomorphic, with a
unique isomorphism. The
isomorphism theorems provide canonical isomorphisms that are not unique. The term
isomorphism is
mainly used for algebraic...
- mathematics,
specifically abstract algebra, the
isomorphism theorems (also
known as Noether's
isomorphism theorems) are
theorems that
describe the relationship...
- that
subgraph isomorphism remains NP-complete even in the
planar case.
Subgraph isomorphism is a
generalization of the
graph isomorphism problem, which...
- in
accordance with the
general notion of
isomorphism being a structure-preserving bijection. If an
isomorphism exists between two graphs, then the graphs...
- the
mathematical field of
topology a
uniform isomorphism or
uniform homeomorphism is a
special isomorphism between uniform spaces that
respects uniform...
- of
order theory, an
order isomorphism is a
special kind of
monotone function that
constitutes a
suitable notion of
isomorphism for
partially ordered sets...
-
institutional isomorphism and
collective rationality in
organizational fields. The term is
borrowed from the
mathematical concept of
isomorphism.
Isomorphism in...
- Look up
isomorphism or
isomorph in Wiktionary, the free dictionary.
Isomorphism or
isomorph may
refer to:
Isomorphism, in mathematics, logic, philosophy...
-
bijective correspondence. Thus, the
definition of an
isomorphism is
quite natural. An
isomorphism of
groups may
equivalently be
defined as an invertible...
- In mathematics, a
Borel isomorphism is a
measurable bijective function between two
standard Borel spaces. By Souslin's
theorem in
standard Borel spaces...
