- maps
between spaces. Nowadays,
functors are used
throughout modern mathematics to
relate various categories. Thus,
functors are
important in all
areas within...
-
relationship that two
functors may exhibit,
intuitively corresponding to a weak form of
equivalence between two
related categories. Two
functors that
stand in...
-
addition to
those functors that
delete some of the operations,
there are
functors that
forget some of the axioms.
There is a
functor from the category...
-
between objects) give rise to
important functors to the
category of sets.
These functors are
called hom-
functors and have
numerous applications in category...
- up
functor in Wiktionary, the free dictionary. A
functor, in mathematics, is a map
between categories.
Functor may also
refer to:
Predicate functor in...
-
Gorenstein (1969) who
defined signalizer functors,
Glauberman (1976) who
proved the
Solvable Signalizer Functor Theorem for
solvable groups, and McBride (1982a...
-
contravariant functor acts as a
covariant functor from the
opposite category Cop to D. A
natural transformation is a
relation between two
functors.
Functors often...
- of
adjoint functors is that
every right adjoint functor is
continuous and
every left
adjoint functor is cocontinuous.
Since adjoint functors exist in abundance...
- mathematics, the Tor
functors are the
derived functors of the
tensor product of
modules over a ring.
Along with the Ext
functor, Tor is one of the central...
- 11
Functors,
Applicative Functors and
Monoids in
Learn You a
Haskell for
Great Good! Do****entation for
Functor in Cats
library Section about Functor in...