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.
groupoid |
gyrogroup |
As nouns the difference between groupoid and gyrogroup
is that
groupoid is (algebra) a magma: a set with a total binary operation while
gyrogroup is (mathematics) a groupoid whose binary operation satisfies certain axioms, used with gyrovectors.
groupoid |
subgroupoid |
As nouns the difference between groupoid and subgroupoid
is that
groupoid is (algebra) a magma: a set with a total binary operation while
subgroupoid is (mathematics) a subset of a groupoid closed under inversion and composition.
groupoid |
algebroid |
As nouns the difference between groupoid and algebroid
is that
groupoid is a magma: a set with a total binary operation while
algebroid is an infinitesimal algebraic object associated with a groupoid.
As an adjective algebroid is
describing algebraic characteristics of groupoids.
inverse |
groupoid |
As a verb inverse
is .
As an adjective inverse
is inverted.
As a noun groupoid is
(algebra) a magma: a set with a total binary operation.
associative |
groupoid |
As an adjective associative
is pertaining to, resulting from, or characterised by association; capable of associating; tending to associate or unite.
As a noun groupoid is
(algebra) a magma: a set with a total binary operation.
partial |
groupoid |
As nouns the difference between partial and groupoid
is that
partial is (mathematics) a partial derivative: a derivative with respect to one independent variable of a function in multiple variables while
groupoid is (algebra) a magma: a set with a total binary operation.
As an adjective partial
is existing as a part or portion; incomplete.
operation |
groupoid |
As nouns the difference between operation and groupoid
is that
operation is operation (method by which a device performs its function) while
groupoid is (algebra) a magma: a set with a total binary operation.
binary |
groupoid |
As nouns the difference between binary and groupoid
is that
binary is (mathematics|computing|uncountable) the bijective base-2 numeral system, which uses only the digits while
groupoid is (algebra) a magma: a set with a total binary operation.
As an adjective binary
is being in a state of one of two mutually exclusive conditions such as on or off, true or false, molten or frozen, presence or absence of a signal.
total |
groupoid |
As nouns the difference between total and groupoid
is that
total is an amount obtained by the addition of smaller amounts while
groupoid is (algebra) a magma: a set with a total binary operation.
As an adjective total
is entire; relating to the whole of something.
As a verb total
is to add up; to calculate the sum of.
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