semigroup |
gr |
As a noun semigroup
is (mathematics) any set for which there is a binary operation that is both closed and associative.
As an abbreviation gr is
grain, a unit of mass.
groupoid |
semigroup |
As nouns the difference between groupoid and semigroup
is that
groupoid is a magma: a set with a total binary operation while
semigroup is any set for which there is a binary operation that is both closed and associative.
semigroup |
semigroud |
In mathematics|lang=en terms the difference between semigroup and semigroud
is that
semigroup is (mathematics) any set for which there is a binary operation that is both closed and associative while
semigroud is (mathematics) semiheap.
As nouns the difference between semigroup and semigroud
is that
semigroup is (mathematics) any set for which there is a binary operation that is both closed and associative while
semigroud is (mathematics) semiheap.
fora |
semigroup |
As a verb fora
is .
As a noun semigroup is
(mathematics) any set for which there is a binary operation that is both closed and associative.
taxonomy |
semigroup |
As nouns the difference between taxonomy and semigroup
is that
taxonomy is the science or the technique used to make a classification while
semigroup is (mathematics) any set for which there is a binary operation that is both closed and associative.
semigroup |
commutant |
As nouns the difference between semigroup and commutant
is that
semigroup is any set for which there is a binary operation that is both closed and associative while
commutant is the subset of all elements of a semigroup that commute with the elements of a given subset.
Pages